0.002 * [progress]: [Phase 1 of 3] Setting up.
0.003 * * * [progress]: [1/2] Preparing points
0.731 * * * [progress]: [2/2] Setting up program.
0.736 * [progress]: [Phase 2 of 3] Improving.
0.736 * * * * [progress]: [ 1 / 1 ] simplifiying candidate #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))>
0.736 * [simplify]: Simplifying:
  (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l))))
0.736 * * [simplify]: iteration 1: (22 enodes)
0.744 * * [simplify]: iteration 2: (102 enodes)
0.776 * * [simplify]: iteration 3: (258 enodes)
0.947 * * [simplify]: iteration 4: (1353 enodes)
4.601 * * [simplify]: Extracting #0: cost 1 inf + 0
4.601 * * [simplify]: Extracting #1: cost 70 inf + 0
4.603 * * [simplify]: Extracting #2: cost 489 inf + 1
4.612 * * [simplify]: Extracting #3: cost 2653 inf + 6183
4.651 * * [simplify]: Extracting #4: cost 3062 inf + 89269
4.797 * * [simplify]: Extracting #5: cost 1319 inf + 575700
5.101 * * [simplify]: Extracting #6: cost 15 inf + 964208
5.422 * * [simplify]: Extracting #7: cost 0 inf + 959580
5.765 * * [simplify]: Extracting #8: cost 0 inf + 959139
6.169 * [simplify]: Simplified to:
  (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))
6.187 * * [progress]: iteration 1 / 4
6.187 * * * [progress]: picking best candidate
6.197 * * * * [pick]: Picked  #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.197 * * * [progress]: localizing error
6.254 * * * [progress]: generating rewritten candidates
6.254 * * * * [progress]: [ 1 / 4 ] rewriting at (2 2 1 1 1)
6.256 * * * * [progress]: [ 2 / 4 ] rewriting at (2 1 1)
6.258 * * * * [progress]: [ 3 / 4 ] rewriting at (2 2 1 1 2)
6.260 * * * * [progress]: [ 4 / 4 ] rewriting at (2 1 2)
6.268 * * * [progress]: generating series expansions
6.269 * * * * [progress]: [ 1 / 4 ] generating series at (2 2 1 1 1)
6.269 * [backup-simplify]: Simplify (sqrt (/ d l)) into (sqrt (/ d l))
6.269 * [approximate]: Taking taylor expansion of (sqrt (/ d l)) in (d l) around 0
6.269 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in l
6.269 * [taylor]: Taking taylor expansion of (/ d l) in l
6.269 * [taylor]: Taking taylor expansion of d in l
6.269 * [backup-simplify]: Simplify d into d
6.269 * [taylor]: Taking taylor expansion of l in l
6.269 * [backup-simplify]: Simplify 0 into 0
6.269 * [backup-simplify]: Simplify 1 into 1
6.269 * [backup-simplify]: Simplify (/ d 1) into d
6.269 * [backup-simplify]: Simplify (sqrt 0) into 0
6.270 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
6.270 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in d
6.270 * [taylor]: Taking taylor expansion of (/ d l) in d
6.270 * [taylor]: Taking taylor expansion of d in d
6.270 * [backup-simplify]: Simplify 0 into 0
6.270 * [backup-simplify]: Simplify 1 into 1
6.270 * [taylor]: Taking taylor expansion of l in d
6.270 * [backup-simplify]: Simplify l into l
6.270 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
6.270 * [backup-simplify]: Simplify (sqrt 0) into 0
6.270 * [backup-simplify]: Simplify (/ (/ 1 l) (* 2 (sqrt 0))) into (/ +nan.0 l)
6.270 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in d
6.270 * [taylor]: Taking taylor expansion of (/ d l) in d
6.270 * [taylor]: Taking taylor expansion of d in d
6.270 * [backup-simplify]: Simplify 0 into 0
6.270 * [backup-simplify]: Simplify 1 into 1
6.270 * [taylor]: Taking taylor expansion of l in d
6.270 * [backup-simplify]: Simplify l into l
6.271 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
6.271 * [backup-simplify]: Simplify (sqrt 0) into 0
6.271 * [backup-simplify]: Simplify (/ (/ 1 l) (* 2 (sqrt 0))) into (/ +nan.0 l)
6.271 * [taylor]: Taking taylor expansion of 0 in l
6.271 * [backup-simplify]: Simplify 0 into 0
6.271 * [taylor]: Taking taylor expansion of (/ +nan.0 l) in l
6.271 * [taylor]: Taking taylor expansion of +nan.0 in l
6.271 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.271 * [taylor]: Taking taylor expansion of l in l
6.271 * [backup-simplify]: Simplify 0 into 0
6.271 * [backup-simplify]: Simplify 1 into 1
6.272 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.272 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.272 * [backup-simplify]: Simplify 0 into 0
6.272 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ 1 l) (/ 0 l)))) into 0
6.272 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 l) 2) (+)) (* 2 0)) into (/ +nan.0 (pow l 2))
6.272 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow l 2)) in l
6.272 * [taylor]: Taking taylor expansion of +nan.0 in l
6.272 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.272 * [taylor]: Taking taylor expansion of (pow l 2) in l
6.272 * [taylor]: Taking taylor expansion of l in l
6.272 * [backup-simplify]: Simplify 0 into 0
6.272 * [backup-simplify]: Simplify 1 into 1
6.273 * [backup-simplify]: Simplify (* 1 1) into 1
6.273 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.273 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.274 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.274 * [backup-simplify]: Simplify 0 into 0
6.274 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.274 * [backup-simplify]: Simplify 0 into 0
6.274 * [backup-simplify]: Simplify 0 into 0
6.275 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ 1 l) (/ 0 l)) (* 0 (/ 0 l)))) into 0
6.275 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 l) (/ +nan.0 (pow l 2)))))) (* 2 0)) into (/ +nan.0 (pow l 3))
6.275 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow l 3)) in l
6.275 * [taylor]: Taking taylor expansion of +nan.0 in l
6.275 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.275 * [taylor]: Taking taylor expansion of (pow l 3) in l
6.275 * [taylor]: Taking taylor expansion of l in l
6.275 * [backup-simplify]: Simplify 0 into 0
6.275 * [backup-simplify]: Simplify 1 into 1
6.276 * [backup-simplify]: Simplify (* 1 1) into 1
6.276 * [backup-simplify]: Simplify (* 1 1) into 1
6.276 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.277 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.277 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.278 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.278 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.279 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.279 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.279 * [backup-simplify]: Simplify 0 into 0
6.280 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.280 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.280 * [backup-simplify]: Simplify 0 into 0
6.280 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 l) d)) into (* +nan.0 (/ d l))
6.280 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 l))) into (sqrt (/ l d))
6.280 * [approximate]: Taking taylor expansion of (sqrt (/ l d)) in (d l) around 0
6.280 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in l
6.280 * [taylor]: Taking taylor expansion of (/ l d) in l
6.280 * [taylor]: Taking taylor expansion of l in l
6.280 * [backup-simplify]: Simplify 0 into 0
6.281 * [backup-simplify]: Simplify 1 into 1
6.281 * [taylor]: Taking taylor expansion of d in l
6.281 * [backup-simplify]: Simplify d into d
6.281 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
6.281 * [backup-simplify]: Simplify (sqrt 0) into 0
6.281 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
6.281 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
6.281 * [taylor]: Taking taylor expansion of (/ l d) in d
6.281 * [taylor]: Taking taylor expansion of l in d
6.281 * [backup-simplify]: Simplify l into l
6.281 * [taylor]: Taking taylor expansion of d in d
6.281 * [backup-simplify]: Simplify 0 into 0
6.281 * [backup-simplify]: Simplify 1 into 1
6.281 * [backup-simplify]: Simplify (/ l 1) into l
6.282 * [backup-simplify]: Simplify (sqrt 0) into 0
6.282 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
6.282 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
6.282 * [taylor]: Taking taylor expansion of (/ l d) in d
6.282 * [taylor]: Taking taylor expansion of l in d
6.282 * [backup-simplify]: Simplify l into l
6.282 * [taylor]: Taking taylor expansion of d in d
6.282 * [backup-simplify]: Simplify 0 into 0
6.282 * [backup-simplify]: Simplify 1 into 1
6.282 * [backup-simplify]: Simplify (/ l 1) into l
6.282 * [backup-simplify]: Simplify (sqrt 0) into 0
6.283 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
6.283 * [taylor]: Taking taylor expansion of 0 in l
6.283 * [backup-simplify]: Simplify 0 into 0
6.283 * [backup-simplify]: Simplify 0 into 0
6.283 * [taylor]: Taking taylor expansion of (* +nan.0 l) in l
6.283 * [taylor]: Taking taylor expansion of +nan.0 in l
6.283 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.283 * [taylor]: Taking taylor expansion of l in l
6.283 * [backup-simplify]: Simplify 0 into 0
6.283 * [backup-simplify]: Simplify 1 into 1
6.283 * [backup-simplify]: Simplify (* +nan.0 0) into 0
6.283 * [backup-simplify]: Simplify 0 into 0
6.283 * [backup-simplify]: Simplify 0 into 0
6.284 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)))) into 0
6.284 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 l) 2) (+)) (* 2 0)) into (* +nan.0 (pow l 2))
6.284 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 2)) in l
6.284 * [taylor]: Taking taylor expansion of +nan.0 in l
6.284 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.284 * [taylor]: Taking taylor expansion of (pow l 2) in l
6.284 * [taylor]: Taking taylor expansion of l in l
6.284 * [backup-simplify]: Simplify 0 into 0
6.284 * [backup-simplify]: Simplify 1 into 1
6.285 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
6.285 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
6.285 * [backup-simplify]: Simplify 0 into 0
6.286 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.287 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 2)))))) (* 2 0)) into (* +nan.0 (pow l 3))
6.287 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 3)) in l
6.287 * [taylor]: Taking taylor expansion of +nan.0 in l
6.287 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.287 * [taylor]: Taking taylor expansion of (pow l 3) in l
6.287 * [taylor]: Taking taylor expansion of l in l
6.287 * [backup-simplify]: Simplify 0 into 0
6.287 * [backup-simplify]: Simplify 1 into 1
6.287 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
6.287 * [backup-simplify]: Simplify 0 into 0
6.287 * [backup-simplify]: Simplify 0 into 0
6.289 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.289 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 2)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 4))
6.289 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 4)) in l
6.289 * [taylor]: Taking taylor expansion of +nan.0 in l
6.289 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.289 * [taylor]: Taking taylor expansion of (pow l 4) in l
6.289 * [taylor]: Taking taylor expansion of l in l
6.289 * [backup-simplify]: Simplify 0 into 0
6.289 * [backup-simplify]: Simplify 1 into 1
6.289 * [backup-simplify]: Simplify (* 1 1) into 1
6.290 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.290 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.290 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
6.290 * [backup-simplify]: Simplify 0 into 0
6.290 * [backup-simplify]: Simplify 0 into 0
6.292 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.292 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 4)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 5))
6.292 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 5)) in l
6.292 * [taylor]: Taking taylor expansion of +nan.0 in l
6.292 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.292 * [taylor]: Taking taylor expansion of (pow l 5) in l
6.293 * [taylor]: Taking taylor expansion of l in l
6.293 * [backup-simplify]: Simplify 0 into 0
6.293 * [backup-simplify]: Simplify 1 into 1
6.293 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.293 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
6.293 * [backup-simplify]: Simplify 0 into 0
6.294 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
6.294 * [backup-simplify]: Simplify 0 into 0
6.294 * [backup-simplify]: Simplify 0 into 0
6.296 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.297 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 3)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 5)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 4)))))) (* 2 0)) into (* +nan.0 (pow l 6))
6.297 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 6)) in l
6.297 * [taylor]: Taking taylor expansion of +nan.0 in l
6.297 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.297 * [taylor]: Taking taylor expansion of (pow l 6) in l
6.297 * [taylor]: Taking taylor expansion of l in l
6.297 * [backup-simplify]: Simplify 0 into 0
6.297 * [backup-simplify]: Simplify 1 into 1
6.297 * [backup-simplify]: Simplify (* 1 1) into 1
6.297 * [backup-simplify]: Simplify (* 1 1) into 1
6.298 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.298 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.298 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 l) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 l) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 l) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
6.298 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- l)))) into (sqrt (/ l d))
6.298 * [approximate]: Taking taylor expansion of (sqrt (/ l d)) in (d l) around 0
6.298 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in l
6.298 * [taylor]: Taking taylor expansion of (/ l d) in l
6.298 * [taylor]: Taking taylor expansion of l in l
6.298 * [backup-simplify]: Simplify 0 into 0
6.299 * [backup-simplify]: Simplify 1 into 1
6.299 * [taylor]: Taking taylor expansion of d in l
6.299 * [backup-simplify]: Simplify d into d
6.299 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
6.299 * [backup-simplify]: Simplify (sqrt 0) into 0
6.299 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
6.299 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
6.299 * [taylor]: Taking taylor expansion of (/ l d) in d
6.299 * [taylor]: Taking taylor expansion of l in d
6.299 * [backup-simplify]: Simplify l into l
6.299 * [taylor]: Taking taylor expansion of d in d
6.299 * [backup-simplify]: Simplify 0 into 0
6.299 * [backup-simplify]: Simplify 1 into 1
6.299 * [backup-simplify]: Simplify (/ l 1) into l
6.300 * [backup-simplify]: Simplify (sqrt 0) into 0
6.300 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
6.300 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
6.300 * [taylor]: Taking taylor expansion of (/ l d) in d
6.300 * [taylor]: Taking taylor expansion of l in d
6.300 * [backup-simplify]: Simplify l into l
6.300 * [taylor]: Taking taylor expansion of d in d
6.300 * [backup-simplify]: Simplify 0 into 0
6.300 * [backup-simplify]: Simplify 1 into 1
6.300 * [backup-simplify]: Simplify (/ l 1) into l
6.300 * [backup-simplify]: Simplify (sqrt 0) into 0
6.301 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
6.301 * [taylor]: Taking taylor expansion of 0 in l
6.301 * [backup-simplify]: Simplify 0 into 0
6.301 * [backup-simplify]: Simplify 0 into 0
6.301 * [taylor]: Taking taylor expansion of (* +nan.0 l) in l
6.301 * [taylor]: Taking taylor expansion of +nan.0 in l
6.301 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.301 * [taylor]: Taking taylor expansion of l in l
6.301 * [backup-simplify]: Simplify 0 into 0
6.301 * [backup-simplify]: Simplify 1 into 1
6.301 * [backup-simplify]: Simplify (* +nan.0 0) into 0
6.301 * [backup-simplify]: Simplify 0 into 0
6.301 * [backup-simplify]: Simplify 0 into 0
6.302 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)))) into 0
6.302 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 l) 2) (+)) (* 2 0)) into (* +nan.0 (pow l 2))
6.302 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 2)) in l
6.302 * [taylor]: Taking taylor expansion of +nan.0 in l
6.302 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.302 * [taylor]: Taking taylor expansion of (pow l 2) in l
6.302 * [taylor]: Taking taylor expansion of l in l
6.302 * [backup-simplify]: Simplify 0 into 0
6.302 * [backup-simplify]: Simplify 1 into 1
6.303 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
6.304 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
6.304 * [backup-simplify]: Simplify 0 into 0
6.305 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.306 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 2)))))) (* 2 0)) into (* +nan.0 (pow l 3))
6.306 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 3)) in l
6.306 * [taylor]: Taking taylor expansion of +nan.0 in l
6.306 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.306 * [taylor]: Taking taylor expansion of (pow l 3) in l
6.306 * [taylor]: Taking taylor expansion of l in l
6.306 * [backup-simplify]: Simplify 0 into 0
6.306 * [backup-simplify]: Simplify 1 into 1
6.307 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
6.308 * [backup-simplify]: Simplify 0 into 0
6.308 * [backup-simplify]: Simplify 0 into 0
6.309 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.310 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 2)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 4))
6.310 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 4)) in l
6.310 * [taylor]: Taking taylor expansion of +nan.0 in l
6.310 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.310 * [taylor]: Taking taylor expansion of (pow l 4) in l
6.310 * [taylor]: Taking taylor expansion of l in l
6.310 * [backup-simplify]: Simplify 0 into 0
6.311 * [backup-simplify]: Simplify 1 into 1
6.311 * [backup-simplify]: Simplify (* 1 1) into 1
6.311 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.311 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.313 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
6.313 * [backup-simplify]: Simplify 0 into 0
6.313 * [backup-simplify]: Simplify 0 into 0
6.315 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.316 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 4)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 5))
6.316 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 5)) in l
6.316 * [taylor]: Taking taylor expansion of +nan.0 in l
6.316 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.316 * [taylor]: Taking taylor expansion of (pow l 5) in l
6.316 * [taylor]: Taking taylor expansion of l in l
6.316 * [backup-simplify]: Simplify 0 into 0
6.316 * [backup-simplify]: Simplify 1 into 1
6.317 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.317 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
6.317 * [backup-simplify]: Simplify 0 into 0
6.319 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
6.319 * [backup-simplify]: Simplify 0 into 0
6.319 * [backup-simplify]: Simplify 0 into 0
6.322 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.323 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 3)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 5)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 4)))))) (* 2 0)) into (* +nan.0 (pow l 6))
6.323 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 6)) in l
6.323 * [taylor]: Taking taylor expansion of +nan.0 in l
6.323 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.323 * [taylor]: Taking taylor expansion of (pow l 6) in l
6.323 * [taylor]: Taking taylor expansion of l in l
6.323 * [backup-simplify]: Simplify 0 into 0
6.323 * [backup-simplify]: Simplify 1 into 1
6.323 * [backup-simplify]: Simplify (* 1 1) into 1
6.324 * [backup-simplify]: Simplify (* 1 1) into 1
6.324 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.324 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.325 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- l)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- l)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- l)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
6.325 * * * * [progress]: [ 2 / 4 ] generating series at (2 1 1)
6.325 * [backup-simplify]: Simplify (sqrt (/ d l)) into (sqrt (/ d l))
6.325 * [approximate]: Taking taylor expansion of (sqrt (/ d l)) in (d l) around 0
6.325 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in l
6.325 * [taylor]: Taking taylor expansion of (/ d l) in l
6.325 * [taylor]: Taking taylor expansion of d in l
6.325 * [backup-simplify]: Simplify d into d
6.325 * [taylor]: Taking taylor expansion of l in l
6.326 * [backup-simplify]: Simplify 0 into 0
6.326 * [backup-simplify]: Simplify 1 into 1
6.326 * [backup-simplify]: Simplify (/ d 1) into d
6.326 * [backup-simplify]: Simplify (sqrt 0) into 0
6.326 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
6.327 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in d
6.327 * [taylor]: Taking taylor expansion of (/ d l) in d
6.327 * [taylor]: Taking taylor expansion of d in d
6.327 * [backup-simplify]: Simplify 0 into 0
6.327 * [backup-simplify]: Simplify 1 into 1
6.327 * [taylor]: Taking taylor expansion of l in d
6.327 * [backup-simplify]: Simplify l into l
6.327 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
6.327 * [backup-simplify]: Simplify (sqrt 0) into 0
6.328 * [backup-simplify]: Simplify (/ (/ 1 l) (* 2 (sqrt 0))) into (/ +nan.0 l)
6.328 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in d
6.328 * [taylor]: Taking taylor expansion of (/ d l) in d
6.328 * [taylor]: Taking taylor expansion of d in d
6.328 * [backup-simplify]: Simplify 0 into 0
6.328 * [backup-simplify]: Simplify 1 into 1
6.328 * [taylor]: Taking taylor expansion of l in d
6.328 * [backup-simplify]: Simplify l into l
6.328 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
6.328 * [backup-simplify]: Simplify (sqrt 0) into 0
6.329 * [backup-simplify]: Simplify (/ (/ 1 l) (* 2 (sqrt 0))) into (/ +nan.0 l)
6.329 * [taylor]: Taking taylor expansion of 0 in l
6.329 * [backup-simplify]: Simplify 0 into 0
6.329 * [taylor]: Taking taylor expansion of (/ +nan.0 l) in l
6.329 * [taylor]: Taking taylor expansion of +nan.0 in l
6.329 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.329 * [taylor]: Taking taylor expansion of l in l
6.329 * [backup-simplify]: Simplify 0 into 0
6.329 * [backup-simplify]: Simplify 1 into 1
6.329 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.330 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.330 * [backup-simplify]: Simplify 0 into 0
6.330 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ 1 l) (/ 0 l)))) into 0
6.331 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 l) 2) (+)) (* 2 0)) into (/ +nan.0 (pow l 2))
6.331 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow l 2)) in l
6.331 * [taylor]: Taking taylor expansion of +nan.0 in l
6.331 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.331 * [taylor]: Taking taylor expansion of (pow l 2) in l
6.331 * [taylor]: Taking taylor expansion of l in l
6.331 * [backup-simplify]: Simplify 0 into 0
6.331 * [backup-simplify]: Simplify 1 into 1
6.331 * [backup-simplify]: Simplify (* 1 1) into 1
6.332 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.332 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.333 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.333 * [backup-simplify]: Simplify 0 into 0
6.334 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.334 * [backup-simplify]: Simplify 0 into 0
6.334 * [backup-simplify]: Simplify 0 into 0
6.334 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ 1 l) (/ 0 l)) (* 0 (/ 0 l)))) into 0
6.335 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 l) (/ +nan.0 (pow l 2)))))) (* 2 0)) into (/ +nan.0 (pow l 3))
6.335 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow l 3)) in l
6.335 * [taylor]: Taking taylor expansion of +nan.0 in l
6.335 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.335 * [taylor]: Taking taylor expansion of (pow l 3) in l
6.335 * [taylor]: Taking taylor expansion of l in l
6.335 * [backup-simplify]: Simplify 0 into 0
6.335 * [backup-simplify]: Simplify 1 into 1
6.336 * [backup-simplify]: Simplify (* 1 1) into 1
6.336 * [backup-simplify]: Simplify (* 1 1) into 1
6.336 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.337 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.338 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.339 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.339 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.340 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.341 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.341 * [backup-simplify]: Simplify 0 into 0
6.342 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.343 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.343 * [backup-simplify]: Simplify 0 into 0
6.343 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 l) d)) into (* +nan.0 (/ d l))
6.344 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 l))) into (sqrt (/ l d))
6.344 * [approximate]: Taking taylor expansion of (sqrt (/ l d)) in (d l) around 0
6.344 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in l
6.344 * [taylor]: Taking taylor expansion of (/ l d) in l
6.344 * [taylor]: Taking taylor expansion of l in l
6.344 * [backup-simplify]: Simplify 0 into 0
6.344 * [backup-simplify]: Simplify 1 into 1
6.344 * [taylor]: Taking taylor expansion of d in l
6.344 * [backup-simplify]: Simplify d into d
6.344 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
6.344 * [backup-simplify]: Simplify (sqrt 0) into 0
6.345 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
6.345 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
6.345 * [taylor]: Taking taylor expansion of (/ l d) in d
6.345 * [taylor]: Taking taylor expansion of l in d
6.345 * [backup-simplify]: Simplify l into l
6.345 * [taylor]: Taking taylor expansion of d in d
6.345 * [backup-simplify]: Simplify 0 into 0
6.345 * [backup-simplify]: Simplify 1 into 1
6.345 * [backup-simplify]: Simplify (/ l 1) into l
6.345 * [backup-simplify]: Simplify (sqrt 0) into 0
6.346 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
6.346 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
6.346 * [taylor]: Taking taylor expansion of (/ l d) in d
6.346 * [taylor]: Taking taylor expansion of l in d
6.346 * [backup-simplify]: Simplify l into l
6.346 * [taylor]: Taking taylor expansion of d in d
6.346 * [backup-simplify]: Simplify 0 into 0
6.346 * [backup-simplify]: Simplify 1 into 1
6.346 * [backup-simplify]: Simplify (/ l 1) into l
6.347 * [backup-simplify]: Simplify (sqrt 0) into 0
6.347 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
6.347 * [taylor]: Taking taylor expansion of 0 in l
6.347 * [backup-simplify]: Simplify 0 into 0
6.347 * [backup-simplify]: Simplify 0 into 0
6.347 * [taylor]: Taking taylor expansion of (* +nan.0 l) in l
6.347 * [taylor]: Taking taylor expansion of +nan.0 in l
6.347 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.347 * [taylor]: Taking taylor expansion of l in l
6.347 * [backup-simplify]: Simplify 0 into 0
6.347 * [backup-simplify]: Simplify 1 into 1
6.348 * [backup-simplify]: Simplify (* +nan.0 0) into 0
6.348 * [backup-simplify]: Simplify 0 into 0
6.348 * [backup-simplify]: Simplify 0 into 0
6.349 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)))) into 0
6.350 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 l) 2) (+)) (* 2 0)) into (* +nan.0 (pow l 2))
6.350 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 2)) in l
6.350 * [taylor]: Taking taylor expansion of +nan.0 in l
6.350 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.350 * [taylor]: Taking taylor expansion of (pow l 2) in l
6.350 * [taylor]: Taking taylor expansion of l in l
6.350 * [backup-simplify]: Simplify 0 into 0
6.350 * [backup-simplify]: Simplify 1 into 1
6.351 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
6.352 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
6.352 * [backup-simplify]: Simplify 0 into 0
6.353 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.354 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 2)))))) (* 2 0)) into (* +nan.0 (pow l 3))
6.354 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 3)) in l
6.354 * [taylor]: Taking taylor expansion of +nan.0 in l
6.354 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.354 * [taylor]: Taking taylor expansion of (pow l 3) in l
6.354 * [taylor]: Taking taylor expansion of l in l
6.354 * [backup-simplify]: Simplify 0 into 0
6.354 * [backup-simplify]: Simplify 1 into 1
6.355 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
6.355 * [backup-simplify]: Simplify 0 into 0
6.355 * [backup-simplify]: Simplify 0 into 0
6.357 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.358 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 2)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 4))
6.358 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 4)) in l
6.358 * [taylor]: Taking taylor expansion of +nan.0 in l
6.358 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.358 * [taylor]: Taking taylor expansion of (pow l 4) in l
6.358 * [taylor]: Taking taylor expansion of l in l
6.358 * [backup-simplify]: Simplify 0 into 0
6.358 * [backup-simplify]: Simplify 1 into 1
6.358 * [backup-simplify]: Simplify (* 1 1) into 1
6.359 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.359 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.360 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
6.360 * [backup-simplify]: Simplify 0 into 0
6.360 * [backup-simplify]: Simplify 0 into 0
6.363 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.364 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 4)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 5))
6.364 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 5)) in l
6.364 * [taylor]: Taking taylor expansion of +nan.0 in l
6.364 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.364 * [taylor]: Taking taylor expansion of (pow l 5) in l
6.364 * [taylor]: Taking taylor expansion of l in l
6.364 * [backup-simplify]: Simplify 0 into 0
6.364 * [backup-simplify]: Simplify 1 into 1
6.365 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.366 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
6.366 * [backup-simplify]: Simplify 0 into 0
6.367 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
6.367 * [backup-simplify]: Simplify 0 into 0
6.367 * [backup-simplify]: Simplify 0 into 0
6.370 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.371 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 3)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 5)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 4)))))) (* 2 0)) into (* +nan.0 (pow l 6))
6.371 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 6)) in l
6.371 * [taylor]: Taking taylor expansion of +nan.0 in l
6.371 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.371 * [taylor]: Taking taylor expansion of (pow l 6) in l
6.372 * [taylor]: Taking taylor expansion of l in l
6.372 * [backup-simplify]: Simplify 0 into 0
6.372 * [backup-simplify]: Simplify 1 into 1
6.372 * [backup-simplify]: Simplify (* 1 1) into 1
6.372 * [backup-simplify]: Simplify (* 1 1) into 1
6.373 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.373 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.374 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 l) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 l) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 l) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
6.374 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- l)))) into (sqrt (/ l d))
6.374 * [approximate]: Taking taylor expansion of (sqrt (/ l d)) in (d l) around 0
6.374 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in l
6.374 * [taylor]: Taking taylor expansion of (/ l d) in l
6.374 * [taylor]: Taking taylor expansion of l in l
6.374 * [backup-simplify]: Simplify 0 into 0
6.374 * [backup-simplify]: Simplify 1 into 1
6.374 * [taylor]: Taking taylor expansion of d in l
6.374 * [backup-simplify]: Simplify d into d
6.374 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
6.375 * [backup-simplify]: Simplify (sqrt 0) into 0
6.375 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
6.375 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
6.375 * [taylor]: Taking taylor expansion of (/ l d) in d
6.375 * [taylor]: Taking taylor expansion of l in d
6.375 * [backup-simplify]: Simplify l into l
6.375 * [taylor]: Taking taylor expansion of d in d
6.375 * [backup-simplify]: Simplify 0 into 0
6.375 * [backup-simplify]: Simplify 1 into 1
6.375 * [backup-simplify]: Simplify (/ l 1) into l
6.376 * [backup-simplify]: Simplify (sqrt 0) into 0
6.376 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
6.376 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
6.376 * [taylor]: Taking taylor expansion of (/ l d) in d
6.377 * [taylor]: Taking taylor expansion of l in d
6.377 * [backup-simplify]: Simplify l into l
6.377 * [taylor]: Taking taylor expansion of d in d
6.377 * [backup-simplify]: Simplify 0 into 0
6.377 * [backup-simplify]: Simplify 1 into 1
6.377 * [backup-simplify]: Simplify (/ l 1) into l
6.377 * [backup-simplify]: Simplify (sqrt 0) into 0
6.378 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
6.378 * [taylor]: Taking taylor expansion of 0 in l
6.378 * [backup-simplify]: Simplify 0 into 0
6.378 * [backup-simplify]: Simplify 0 into 0
6.378 * [taylor]: Taking taylor expansion of (* +nan.0 l) in l
6.378 * [taylor]: Taking taylor expansion of +nan.0 in l
6.378 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.378 * [taylor]: Taking taylor expansion of l in l
6.378 * [backup-simplify]: Simplify 0 into 0
6.378 * [backup-simplify]: Simplify 1 into 1
6.378 * [backup-simplify]: Simplify (* +nan.0 0) into 0
6.378 * [backup-simplify]: Simplify 0 into 0
6.378 * [backup-simplify]: Simplify 0 into 0
6.379 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)))) into 0
6.380 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 l) 2) (+)) (* 2 0)) into (* +nan.0 (pow l 2))
6.380 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 2)) in l
6.380 * [taylor]: Taking taylor expansion of +nan.0 in l
6.380 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.380 * [taylor]: Taking taylor expansion of (pow l 2) in l
6.380 * [taylor]: Taking taylor expansion of l in l
6.380 * [backup-simplify]: Simplify 0 into 0
6.380 * [backup-simplify]: Simplify 1 into 1
6.385 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
6.386 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
6.386 * [backup-simplify]: Simplify 0 into 0
6.387 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.388 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 2)))))) (* 2 0)) into (* +nan.0 (pow l 3))
6.388 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 3)) in l
6.388 * [taylor]: Taking taylor expansion of +nan.0 in l
6.388 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.388 * [taylor]: Taking taylor expansion of (pow l 3) in l
6.388 * [taylor]: Taking taylor expansion of l in l
6.388 * [backup-simplify]: Simplify 0 into 0
6.388 * [backup-simplify]: Simplify 1 into 1
6.389 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
6.389 * [backup-simplify]: Simplify 0 into 0
6.389 * [backup-simplify]: Simplify 0 into 0
6.391 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.392 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 2)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 4))
6.392 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 4)) in l
6.392 * [taylor]: Taking taylor expansion of +nan.0 in l
6.392 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.392 * [taylor]: Taking taylor expansion of (pow l 4) in l
6.392 * [taylor]: Taking taylor expansion of l in l
6.392 * [backup-simplify]: Simplify 0 into 0
6.392 * [backup-simplify]: Simplify 1 into 1
6.393 * [backup-simplify]: Simplify (* 1 1) into 1
6.393 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.393 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.395 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
6.395 * [backup-simplify]: Simplify 0 into 0
6.395 * [backup-simplify]: Simplify 0 into 0
6.397 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.398 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 4)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 5))
6.398 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 5)) in l
6.398 * [taylor]: Taking taylor expansion of +nan.0 in l
6.398 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.398 * [taylor]: Taking taylor expansion of (pow l 5) in l
6.398 * [taylor]: Taking taylor expansion of l in l
6.398 * [backup-simplify]: Simplify 0 into 0
6.398 * [backup-simplify]: Simplify 1 into 1
6.399 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.400 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
6.400 * [backup-simplify]: Simplify 0 into 0
6.401 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
6.401 * [backup-simplify]: Simplify 0 into 0
6.401 * [backup-simplify]: Simplify 0 into 0
6.404 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.405 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 3)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 5)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 4)))))) (* 2 0)) into (* +nan.0 (pow l 6))
6.405 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 6)) in l
6.405 * [taylor]: Taking taylor expansion of +nan.0 in l
6.405 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.405 * [taylor]: Taking taylor expansion of (pow l 6) in l
6.405 * [taylor]: Taking taylor expansion of l in l
6.405 * [backup-simplify]: Simplify 0 into 0
6.405 * [backup-simplify]: Simplify 1 into 1
6.406 * [backup-simplify]: Simplify (* 1 1) into 1
6.406 * [backup-simplify]: Simplify (* 1 1) into 1
6.407 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.407 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.408 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- l)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- l)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- l)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
6.408 * * * * [progress]: [ 3 / 4 ] generating series at (2 2 1 1 2)
6.408 * [backup-simplify]: Simplify (sqrt (/ d h)) into (sqrt (/ d h))
6.408 * [approximate]: Taking taylor expansion of (sqrt (/ d h)) in (d h) around 0
6.408 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in h
6.408 * [taylor]: Taking taylor expansion of (/ d h) in h
6.408 * [taylor]: Taking taylor expansion of d in h
6.408 * [backup-simplify]: Simplify d into d
6.408 * [taylor]: Taking taylor expansion of h in h
6.408 * [backup-simplify]: Simplify 0 into 0
6.408 * [backup-simplify]: Simplify 1 into 1
6.408 * [backup-simplify]: Simplify (/ d 1) into d
6.408 * [backup-simplify]: Simplify (sqrt 0) into 0
6.409 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
6.409 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
6.409 * [taylor]: Taking taylor expansion of (/ d h) in d
6.409 * [taylor]: Taking taylor expansion of d in d
6.409 * [backup-simplify]: Simplify 0 into 0
6.409 * [backup-simplify]: Simplify 1 into 1
6.409 * [taylor]: Taking taylor expansion of h in d
6.409 * [backup-simplify]: Simplify h into h
6.409 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
6.409 * [backup-simplify]: Simplify (sqrt 0) into 0
6.409 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
6.409 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
6.409 * [taylor]: Taking taylor expansion of (/ d h) in d
6.409 * [taylor]: Taking taylor expansion of d in d
6.409 * [backup-simplify]: Simplify 0 into 0
6.409 * [backup-simplify]: Simplify 1 into 1
6.409 * [taylor]: Taking taylor expansion of h in d
6.409 * [backup-simplify]: Simplify h into h
6.409 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
6.410 * [backup-simplify]: Simplify (sqrt 0) into 0
6.410 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
6.410 * [taylor]: Taking taylor expansion of 0 in h
6.410 * [backup-simplify]: Simplify 0 into 0
6.410 * [taylor]: Taking taylor expansion of (/ +nan.0 h) in h
6.410 * [taylor]: Taking taylor expansion of +nan.0 in h
6.410 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.410 * [taylor]: Taking taylor expansion of h in h
6.410 * [backup-simplify]: Simplify 0 into 0
6.410 * [backup-simplify]: Simplify 1 into 1
6.411 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.411 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.411 * [backup-simplify]: Simplify 0 into 0
6.411 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
6.411 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
6.411 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 2)) in h
6.411 * [taylor]: Taking taylor expansion of +nan.0 in h
6.411 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.411 * [taylor]: Taking taylor expansion of (pow h 2) in h
6.411 * [taylor]: Taking taylor expansion of h in h
6.411 * [backup-simplify]: Simplify 0 into 0
6.411 * [backup-simplify]: Simplify 1 into 1
6.412 * [backup-simplify]: Simplify (* 1 1) into 1
6.412 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.412 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.413 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.413 * [backup-simplify]: Simplify 0 into 0
6.413 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.413 * [backup-simplify]: Simplify 0 into 0
6.413 * [backup-simplify]: Simplify 0 into 0
6.413 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
6.414 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
6.414 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 3)) in h
6.414 * [taylor]: Taking taylor expansion of +nan.0 in h
6.414 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.414 * [taylor]: Taking taylor expansion of (pow h 3) in h
6.414 * [taylor]: Taking taylor expansion of h in h
6.414 * [backup-simplify]: Simplify 0 into 0
6.414 * [backup-simplify]: Simplify 1 into 1
6.414 * [backup-simplify]: Simplify (* 1 1) into 1
6.414 * [backup-simplify]: Simplify (* 1 1) into 1
6.415 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.415 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.416 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.416 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.417 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.418 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.418 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.418 * [backup-simplify]: Simplify 0 into 0
6.419 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.419 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.419 * [backup-simplify]: Simplify 0 into 0
6.419 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 h) d)) into (* +nan.0 (/ d h))
6.419 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 h))) into (sqrt (/ h d))
6.419 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
6.419 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
6.419 * [taylor]: Taking taylor expansion of (/ h d) in h
6.419 * [taylor]: Taking taylor expansion of h in h
6.419 * [backup-simplify]: Simplify 0 into 0
6.420 * [backup-simplify]: Simplify 1 into 1
6.420 * [taylor]: Taking taylor expansion of d in h
6.420 * [backup-simplify]: Simplify d into d
6.420 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
6.420 * [backup-simplify]: Simplify (sqrt 0) into 0
6.420 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
6.420 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
6.420 * [taylor]: Taking taylor expansion of (/ h d) in d
6.420 * [taylor]: Taking taylor expansion of h in d
6.420 * [backup-simplify]: Simplify h into h
6.420 * [taylor]: Taking taylor expansion of d in d
6.420 * [backup-simplify]: Simplify 0 into 0
6.420 * [backup-simplify]: Simplify 1 into 1
6.420 * [backup-simplify]: Simplify (/ h 1) into h
6.421 * [backup-simplify]: Simplify (sqrt 0) into 0
6.421 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
6.421 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
6.421 * [taylor]: Taking taylor expansion of (/ h d) in d
6.421 * [taylor]: Taking taylor expansion of h in d
6.421 * [backup-simplify]: Simplify h into h
6.421 * [taylor]: Taking taylor expansion of d in d
6.421 * [backup-simplify]: Simplify 0 into 0
6.421 * [backup-simplify]: Simplify 1 into 1
6.421 * [backup-simplify]: Simplify (/ h 1) into h
6.421 * [backup-simplify]: Simplify (sqrt 0) into 0
6.422 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
6.422 * [taylor]: Taking taylor expansion of 0 in h
6.422 * [backup-simplify]: Simplify 0 into 0
6.422 * [backup-simplify]: Simplify 0 into 0
6.422 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
6.422 * [taylor]: Taking taylor expansion of +nan.0 in h
6.422 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.422 * [taylor]: Taking taylor expansion of h in h
6.422 * [backup-simplify]: Simplify 0 into 0
6.422 * [backup-simplify]: Simplify 1 into 1
6.422 * [backup-simplify]: Simplify (* +nan.0 0) into 0
6.422 * [backup-simplify]: Simplify 0 into 0
6.422 * [backup-simplify]: Simplify 0 into 0
6.423 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
6.423 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
6.423 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
6.423 * [taylor]: Taking taylor expansion of +nan.0 in h
6.423 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.423 * [taylor]: Taking taylor expansion of (pow h 2) in h
6.423 * [taylor]: Taking taylor expansion of h in h
6.423 * [backup-simplify]: Simplify 0 into 0
6.423 * [backup-simplify]: Simplify 1 into 1
6.424 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
6.424 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
6.424 * [backup-simplify]: Simplify 0 into 0
6.425 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.426 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
6.426 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
6.426 * [taylor]: Taking taylor expansion of +nan.0 in h
6.426 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.426 * [taylor]: Taking taylor expansion of (pow h 3) in h
6.426 * [taylor]: Taking taylor expansion of h in h
6.426 * [backup-simplify]: Simplify 0 into 0
6.426 * [backup-simplify]: Simplify 1 into 1
6.426 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
6.426 * [backup-simplify]: Simplify 0 into 0
6.426 * [backup-simplify]: Simplify 0 into 0
6.428 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.428 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
6.428 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
6.428 * [taylor]: Taking taylor expansion of +nan.0 in h
6.428 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.428 * [taylor]: Taking taylor expansion of (pow h 4) in h
6.428 * [taylor]: Taking taylor expansion of h in h
6.428 * [backup-simplify]: Simplify 0 into 0
6.428 * [backup-simplify]: Simplify 1 into 1
6.428 * [backup-simplify]: Simplify (* 1 1) into 1
6.429 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.429 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.429 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
6.429 * [backup-simplify]: Simplify 0 into 0
6.429 * [backup-simplify]: Simplify 0 into 0
6.431 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.431 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
6.431 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
6.431 * [taylor]: Taking taylor expansion of +nan.0 in h
6.431 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.431 * [taylor]: Taking taylor expansion of (pow h 5) in h
6.431 * [taylor]: Taking taylor expansion of h in h
6.431 * [backup-simplify]: Simplify 0 into 0
6.431 * [backup-simplify]: Simplify 1 into 1
6.432 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.432 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
6.432 * [backup-simplify]: Simplify 0 into 0
6.433 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
6.433 * [backup-simplify]: Simplify 0 into 0
6.433 * [backup-simplify]: Simplify 0 into 0
6.435 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.435 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
6.435 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
6.435 * [taylor]: Taking taylor expansion of +nan.0 in h
6.435 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.435 * [taylor]: Taking taylor expansion of (pow h 6) in h
6.436 * [taylor]: Taking taylor expansion of h in h
6.436 * [backup-simplify]: Simplify 0 into 0
6.436 * [backup-simplify]: Simplify 1 into 1
6.436 * [backup-simplify]: Simplify (* 1 1) into 1
6.436 * [backup-simplify]: Simplify (* 1 1) into 1
6.437 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.437 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.438 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 h) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 h) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 h) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
6.438 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- h)))) into (sqrt (/ h d))
6.438 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
6.438 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
6.438 * [taylor]: Taking taylor expansion of (/ h d) in h
6.438 * [taylor]: Taking taylor expansion of h in h
6.438 * [backup-simplify]: Simplify 0 into 0
6.438 * [backup-simplify]: Simplify 1 into 1
6.438 * [taylor]: Taking taylor expansion of d in h
6.438 * [backup-simplify]: Simplify d into d
6.438 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
6.438 * [backup-simplify]: Simplify (sqrt 0) into 0
6.439 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
6.439 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
6.439 * [taylor]: Taking taylor expansion of (/ h d) in d
6.439 * [taylor]: Taking taylor expansion of h in d
6.439 * [backup-simplify]: Simplify h into h
6.439 * [taylor]: Taking taylor expansion of d in d
6.439 * [backup-simplify]: Simplify 0 into 0
6.439 * [backup-simplify]: Simplify 1 into 1
6.439 * [backup-simplify]: Simplify (/ h 1) into h
6.440 * [backup-simplify]: Simplify (sqrt 0) into 0
6.440 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
6.440 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
6.440 * [taylor]: Taking taylor expansion of (/ h d) in d
6.440 * [taylor]: Taking taylor expansion of h in d
6.440 * [backup-simplify]: Simplify h into h
6.440 * [taylor]: Taking taylor expansion of d in d
6.440 * [backup-simplify]: Simplify 0 into 0
6.440 * [backup-simplify]: Simplify 1 into 1
6.440 * [backup-simplify]: Simplify (/ h 1) into h
6.441 * [backup-simplify]: Simplify (sqrt 0) into 0
6.441 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
6.441 * [taylor]: Taking taylor expansion of 0 in h
6.441 * [backup-simplify]: Simplify 0 into 0
6.441 * [backup-simplify]: Simplify 0 into 0
6.441 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
6.441 * [taylor]: Taking taylor expansion of +nan.0 in h
6.441 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.441 * [taylor]: Taking taylor expansion of h in h
6.441 * [backup-simplify]: Simplify 0 into 0
6.442 * [backup-simplify]: Simplify 1 into 1
6.442 * [backup-simplify]: Simplify (* +nan.0 0) into 0
6.442 * [backup-simplify]: Simplify 0 into 0
6.442 * [backup-simplify]: Simplify 0 into 0
6.443 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
6.444 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
6.444 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
6.444 * [taylor]: Taking taylor expansion of +nan.0 in h
6.444 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.444 * [taylor]: Taking taylor expansion of (pow h 2) in h
6.444 * [taylor]: Taking taylor expansion of h in h
6.444 * [backup-simplify]: Simplify 0 into 0
6.444 * [backup-simplify]: Simplify 1 into 1
6.446 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
6.446 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
6.446 * [backup-simplify]: Simplify 0 into 0
6.447 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.448 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
6.448 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
6.448 * [taylor]: Taking taylor expansion of +nan.0 in h
6.448 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.448 * [taylor]: Taking taylor expansion of (pow h 3) in h
6.448 * [taylor]: Taking taylor expansion of h in h
6.448 * [backup-simplify]: Simplify 0 into 0
6.448 * [backup-simplify]: Simplify 1 into 1
6.449 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
6.449 * [backup-simplify]: Simplify 0 into 0
6.449 * [backup-simplify]: Simplify 0 into 0
6.451 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.452 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
6.452 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
6.452 * [taylor]: Taking taylor expansion of +nan.0 in h
6.452 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.452 * [taylor]: Taking taylor expansion of (pow h 4) in h
6.452 * [taylor]: Taking taylor expansion of h in h
6.452 * [backup-simplify]: Simplify 0 into 0
6.452 * [backup-simplify]: Simplify 1 into 1
6.453 * [backup-simplify]: Simplify (* 1 1) into 1
6.453 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.453 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.454 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
6.455 * [backup-simplify]: Simplify 0 into 0
6.455 * [backup-simplify]: Simplify 0 into 0
6.457 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.458 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
6.458 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
6.458 * [taylor]: Taking taylor expansion of +nan.0 in h
6.458 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.458 * [taylor]: Taking taylor expansion of (pow h 5) in h
6.458 * [taylor]: Taking taylor expansion of h in h
6.458 * [backup-simplify]: Simplify 0 into 0
6.458 * [backup-simplify]: Simplify 1 into 1
6.459 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.459 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
6.459 * [backup-simplify]: Simplify 0 into 0
6.461 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
6.461 * [backup-simplify]: Simplify 0 into 0
6.461 * [backup-simplify]: Simplify 0 into 0
6.464 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.465 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
6.465 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
6.465 * [taylor]: Taking taylor expansion of +nan.0 in h
6.465 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.465 * [taylor]: Taking taylor expansion of (pow h 6) in h
6.465 * [taylor]: Taking taylor expansion of h in h
6.465 * [backup-simplify]: Simplify 0 into 0
6.465 * [backup-simplify]: Simplify 1 into 1
6.465 * [backup-simplify]: Simplify (* 1 1) into 1
6.466 * [backup-simplify]: Simplify (* 1 1) into 1
6.466 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.466 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.467 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- h)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- h)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- h)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
6.468 * * * * [progress]: [ 4 / 4 ] generating series at (2 1 2)
6.468 * [backup-simplify]: Simplify (sqrt (/ d h)) into (sqrt (/ d h))
6.468 * [approximate]: Taking taylor expansion of (sqrt (/ d h)) in (d h) around 0
6.468 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in h
6.468 * [taylor]: Taking taylor expansion of (/ d h) in h
6.468 * [taylor]: Taking taylor expansion of d in h
6.468 * [backup-simplify]: Simplify d into d
6.468 * [taylor]: Taking taylor expansion of h in h
6.468 * [backup-simplify]: Simplify 0 into 0
6.468 * [backup-simplify]: Simplify 1 into 1
6.468 * [backup-simplify]: Simplify (/ d 1) into d
6.468 * [backup-simplify]: Simplify (sqrt 0) into 0
6.469 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
6.469 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
6.469 * [taylor]: Taking taylor expansion of (/ d h) in d
6.469 * [taylor]: Taking taylor expansion of d in d
6.469 * [backup-simplify]: Simplify 0 into 0
6.469 * [backup-simplify]: Simplify 1 into 1
6.469 * [taylor]: Taking taylor expansion of h in d
6.469 * [backup-simplify]: Simplify h into h
6.469 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
6.469 * [backup-simplify]: Simplify (sqrt 0) into 0
6.470 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
6.470 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
6.470 * [taylor]: Taking taylor expansion of (/ d h) in d
6.470 * [taylor]: Taking taylor expansion of d in d
6.470 * [backup-simplify]: Simplify 0 into 0
6.470 * [backup-simplify]: Simplify 1 into 1
6.470 * [taylor]: Taking taylor expansion of h in d
6.470 * [backup-simplify]: Simplify h into h
6.470 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
6.471 * [backup-simplify]: Simplify (sqrt 0) into 0
6.471 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
6.471 * [taylor]: Taking taylor expansion of 0 in h
6.471 * [backup-simplify]: Simplify 0 into 0
6.471 * [taylor]: Taking taylor expansion of (/ +nan.0 h) in h
6.471 * [taylor]: Taking taylor expansion of +nan.0 in h
6.471 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.471 * [taylor]: Taking taylor expansion of h in h
6.472 * [backup-simplify]: Simplify 0 into 0
6.472 * [backup-simplify]: Simplify 1 into 1
6.472 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.472 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.472 * [backup-simplify]: Simplify 0 into 0
6.472 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
6.473 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
6.473 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 2)) in h
6.473 * [taylor]: Taking taylor expansion of +nan.0 in h
6.473 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.473 * [taylor]: Taking taylor expansion of (pow h 2) in h
6.473 * [taylor]: Taking taylor expansion of h in h
6.473 * [backup-simplify]: Simplify 0 into 0
6.473 * [backup-simplify]: Simplify 1 into 1
6.474 * [backup-simplify]: Simplify (* 1 1) into 1
6.474 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.475 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.475 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.476 * [backup-simplify]: Simplify 0 into 0
6.477 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.477 * [backup-simplify]: Simplify 0 into 0
6.477 * [backup-simplify]: Simplify 0 into 0
6.477 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
6.478 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
6.478 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 3)) in h
6.478 * [taylor]: Taking taylor expansion of +nan.0 in h
6.478 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.478 * [taylor]: Taking taylor expansion of (pow h 3) in h
6.478 * [taylor]: Taking taylor expansion of h in h
6.478 * [backup-simplify]: Simplify 0 into 0
6.478 * [backup-simplify]: Simplify 1 into 1
6.478 * [backup-simplify]: Simplify (* 1 1) into 1
6.479 * [backup-simplify]: Simplify (* 1 1) into 1
6.479 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
6.480 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.481 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.482 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.482 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.483 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
6.484 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.484 * [backup-simplify]: Simplify 0 into 0
6.485 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
6.486 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.487 * [backup-simplify]: Simplify 0 into 0
6.487 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 h) d)) into (* +nan.0 (/ d h))
6.487 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 h))) into (sqrt (/ h d))
6.487 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
6.487 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
6.487 * [taylor]: Taking taylor expansion of (/ h d) in h
6.487 * [taylor]: Taking taylor expansion of h in h
6.487 * [backup-simplify]: Simplify 0 into 0
6.487 * [backup-simplify]: Simplify 1 into 1
6.487 * [taylor]: Taking taylor expansion of d in h
6.487 * [backup-simplify]: Simplify d into d
6.487 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
6.488 * [backup-simplify]: Simplify (sqrt 0) into 0
6.488 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
6.488 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
6.488 * [taylor]: Taking taylor expansion of (/ h d) in d
6.488 * [taylor]: Taking taylor expansion of h in d
6.488 * [backup-simplify]: Simplify h into h
6.488 * [taylor]: Taking taylor expansion of d in d
6.488 * [backup-simplify]: Simplify 0 into 0
6.488 * [backup-simplify]: Simplify 1 into 1
6.488 * [backup-simplify]: Simplify (/ h 1) into h
6.489 * [backup-simplify]: Simplify (sqrt 0) into 0
6.489 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
6.489 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
6.489 * [taylor]: Taking taylor expansion of (/ h d) in d
6.489 * [taylor]: Taking taylor expansion of h in d
6.490 * [backup-simplify]: Simplify h into h
6.490 * [taylor]: Taking taylor expansion of d in d
6.490 * [backup-simplify]: Simplify 0 into 0
6.490 * [backup-simplify]: Simplify 1 into 1
6.490 * [backup-simplify]: Simplify (/ h 1) into h
6.490 * [backup-simplify]: Simplify (sqrt 0) into 0
6.491 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
6.491 * [taylor]: Taking taylor expansion of 0 in h
6.491 * [backup-simplify]: Simplify 0 into 0
6.491 * [backup-simplify]: Simplify 0 into 0
6.491 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
6.491 * [taylor]: Taking taylor expansion of +nan.0 in h
6.491 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.491 * [taylor]: Taking taylor expansion of h in h
6.491 * [backup-simplify]: Simplify 0 into 0
6.491 * [backup-simplify]: Simplify 1 into 1
6.491 * [backup-simplify]: Simplify (* +nan.0 0) into 0
6.491 * [backup-simplify]: Simplify 0 into 0
6.492 * [backup-simplify]: Simplify 0 into 0
6.493 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
6.493 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
6.493 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
6.494 * [taylor]: Taking taylor expansion of +nan.0 in h
6.494 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.494 * [taylor]: Taking taylor expansion of (pow h 2) in h
6.494 * [taylor]: Taking taylor expansion of h in h
6.494 * [backup-simplify]: Simplify 0 into 0
6.494 * [backup-simplify]: Simplify 1 into 1
6.495 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
6.495 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
6.496 * [backup-simplify]: Simplify 0 into 0
6.497 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.498 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
6.498 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
6.498 * [taylor]: Taking taylor expansion of +nan.0 in h
6.498 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.498 * [taylor]: Taking taylor expansion of (pow h 3) in h
6.498 * [taylor]: Taking taylor expansion of h in h
6.498 * [backup-simplify]: Simplify 0 into 0
6.498 * [backup-simplify]: Simplify 1 into 1
6.499 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
6.499 * [backup-simplify]: Simplify 0 into 0
6.499 * [backup-simplify]: Simplify 0 into 0
6.501 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.502 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
6.502 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
6.502 * [taylor]: Taking taylor expansion of +nan.0 in h
6.502 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.502 * [taylor]: Taking taylor expansion of (pow h 4) in h
6.502 * [taylor]: Taking taylor expansion of h in h
6.502 * [backup-simplify]: Simplify 0 into 0
6.502 * [backup-simplify]: Simplify 1 into 1
6.502 * [backup-simplify]: Simplify (* 1 1) into 1
6.503 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.503 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.504 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
6.504 * [backup-simplify]: Simplify 0 into 0
6.504 * [backup-simplify]: Simplify 0 into 0
6.506 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.507 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
6.507 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
6.507 * [taylor]: Taking taylor expansion of +nan.0 in h
6.507 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.507 * [taylor]: Taking taylor expansion of (pow h 5) in h
6.507 * [taylor]: Taking taylor expansion of h in h
6.507 * [backup-simplify]: Simplify 0 into 0
6.508 * [backup-simplify]: Simplify 1 into 1
6.508 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.511 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
6.511 * [backup-simplify]: Simplify 0 into 0
6.512 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
6.512 * [backup-simplify]: Simplify 0 into 0
6.512 * [backup-simplify]: Simplify 0 into 0
6.515 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.516 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
6.516 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
6.516 * [taylor]: Taking taylor expansion of +nan.0 in h
6.516 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.516 * [taylor]: Taking taylor expansion of (pow h 6) in h
6.517 * [taylor]: Taking taylor expansion of h in h
6.517 * [backup-simplify]: Simplify 0 into 0
6.517 * [backup-simplify]: Simplify 1 into 1
6.517 * [backup-simplify]: Simplify (* 1 1) into 1
6.517 * [backup-simplify]: Simplify (* 1 1) into 1
6.518 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.518 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.519 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 h) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 h) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 h) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
6.519 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- h)))) into (sqrt (/ h d))
6.519 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
6.519 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
6.519 * [taylor]: Taking taylor expansion of (/ h d) in h
6.519 * [taylor]: Taking taylor expansion of h in h
6.519 * [backup-simplify]: Simplify 0 into 0
6.519 * [backup-simplify]: Simplify 1 into 1
6.519 * [taylor]: Taking taylor expansion of d in h
6.519 * [backup-simplify]: Simplify d into d
6.519 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
6.520 * [backup-simplify]: Simplify (sqrt 0) into 0
6.520 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
6.520 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
6.520 * [taylor]: Taking taylor expansion of (/ h d) in d
6.520 * [taylor]: Taking taylor expansion of h in d
6.520 * [backup-simplify]: Simplify h into h
6.520 * [taylor]: Taking taylor expansion of d in d
6.520 * [backup-simplify]: Simplify 0 into 0
6.520 * [backup-simplify]: Simplify 1 into 1
6.521 * [backup-simplify]: Simplify (/ h 1) into h
6.521 * [backup-simplify]: Simplify (sqrt 0) into 0
6.521 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
6.521 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
6.522 * [taylor]: Taking taylor expansion of (/ h d) in d
6.522 * [taylor]: Taking taylor expansion of h in d
6.522 * [backup-simplify]: Simplify h into h
6.522 * [taylor]: Taking taylor expansion of d in d
6.522 * [backup-simplify]: Simplify 0 into 0
6.522 * [backup-simplify]: Simplify 1 into 1
6.522 * [backup-simplify]: Simplify (/ h 1) into h
6.522 * [backup-simplify]: Simplify (sqrt 0) into 0
6.523 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
6.523 * [taylor]: Taking taylor expansion of 0 in h
6.523 * [backup-simplify]: Simplify 0 into 0
6.523 * [backup-simplify]: Simplify 0 into 0
6.523 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
6.523 * [taylor]: Taking taylor expansion of +nan.0 in h
6.523 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.523 * [taylor]: Taking taylor expansion of h in h
6.523 * [backup-simplify]: Simplify 0 into 0
6.523 * [backup-simplify]: Simplify 1 into 1
6.524 * [backup-simplify]: Simplify (* +nan.0 0) into 0
6.524 * [backup-simplify]: Simplify 0 into 0
6.524 * [backup-simplify]: Simplify 0 into 0
6.525 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
6.526 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
6.526 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
6.526 * [taylor]: Taking taylor expansion of +nan.0 in h
6.526 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.526 * [taylor]: Taking taylor expansion of (pow h 2) in h
6.526 * [taylor]: Taking taylor expansion of h in h
6.526 * [backup-simplify]: Simplify 0 into 0
6.526 * [backup-simplify]: Simplify 1 into 1
6.528 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
6.528 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
6.528 * [backup-simplify]: Simplify 0 into 0
6.529 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.530 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
6.530 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
6.530 * [taylor]: Taking taylor expansion of +nan.0 in h
6.530 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.530 * [taylor]: Taking taylor expansion of (pow h 3) in h
6.530 * [taylor]: Taking taylor expansion of h in h
6.530 * [backup-simplify]: Simplify 0 into 0
6.530 * [backup-simplify]: Simplify 1 into 1
6.531 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
6.531 * [backup-simplify]: Simplify 0 into 0
6.531 * [backup-simplify]: Simplify 0 into 0
6.533 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.534 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
6.534 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
6.534 * [taylor]: Taking taylor expansion of +nan.0 in h
6.534 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.534 * [taylor]: Taking taylor expansion of (pow h 4) in h
6.534 * [taylor]: Taking taylor expansion of h in h
6.534 * [backup-simplify]: Simplify 0 into 0
6.535 * [backup-simplify]: Simplify 1 into 1
6.535 * [backup-simplify]: Simplify (* 1 1) into 1
6.535 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.535 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.537 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
6.537 * [backup-simplify]: Simplify 0 into 0
6.537 * [backup-simplify]: Simplify 0 into 0
6.539 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.540 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
6.540 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
6.540 * [taylor]: Taking taylor expansion of +nan.0 in h
6.540 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.540 * [taylor]: Taking taylor expansion of (pow h 5) in h
6.540 * [taylor]: Taking taylor expansion of h in h
6.540 * [backup-simplify]: Simplify 0 into 0
6.540 * [backup-simplify]: Simplify 1 into 1
6.541 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
6.541 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
6.541 * [backup-simplify]: Simplify 0 into 0
6.543 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
6.543 * [backup-simplify]: Simplify 0 into 0
6.543 * [backup-simplify]: Simplify 0 into 0
6.546 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
6.547 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
6.547 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
6.547 * [taylor]: Taking taylor expansion of +nan.0 in h
6.547 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.547 * [taylor]: Taking taylor expansion of (pow h 6) in h
6.547 * [taylor]: Taking taylor expansion of h in h
6.547 * [backup-simplify]: Simplify 0 into 0
6.547 * [backup-simplify]: Simplify 1 into 1
6.548 * [backup-simplify]: Simplify (* 1 1) into 1
6.548 * [backup-simplify]: Simplify (* 1 1) into 1
6.548 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
6.548 * [backup-simplify]: Simplify +nan.0 into +nan.0
6.549 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- h)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- h)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- h)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
6.549 * * * [progress]: simplifying candidates
6.550 * * * * [progress]: [ 1 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (pow (/ d l) 1/2) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 2 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (pow (sqrt (/ d l)) 1) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 3 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (exp (log (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 4 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (log (exp (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 5 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 6 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (cbrt (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 7 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (* (cbrt (/ d l)) (cbrt (/ d l)))) (sqrt (cbrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 8 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 9 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt l) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 10 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt l))) (sqrt (/ (cbrt d) (sqrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 11 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.550 * * * * [progress]: [ 12 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (sqrt d) (* (cbrt l) (cbrt l)))) (sqrt (/ (sqrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 13 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (sqrt d) (sqrt l))) (sqrt (/ (sqrt d) (sqrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 14 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 15 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 16 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ 1 (sqrt l))) (sqrt (/ d (sqrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 17 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ 1 1)) (sqrt (/ d l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 18 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt 1) (sqrt (/ d l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 19 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 20 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (/ (sqrt d) (sqrt l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 21 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (pow (/ d l) (/ 1 2)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 22 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 23 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (fabs (sqrt (/ d l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 24 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (fabs (/ (sqrt d) (sqrt l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.551 * * * * [progress]: [ 25 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* 1 (sqrt (/ d l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 26 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (posit16->real (real->posit16 (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 27 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (pow (/ d l) 1/2) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 28 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (pow (sqrt (/ d l)) 1) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 29 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (exp (log (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 30 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (log (exp (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 31 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 32 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (cbrt (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 33 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (* (cbrt (/ d l)) (cbrt (/ d l)))) (sqrt (cbrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 34 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 35 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt l) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 36 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt l))) (sqrt (/ (cbrt d) (sqrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 37 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 38 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ (sqrt d) (* (cbrt l) (cbrt l)))) (sqrt (/ (sqrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.552 * * * * [progress]: [ 39 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ (sqrt d) (sqrt l))) (sqrt (/ (sqrt d) (sqrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 40 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 41 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 42 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (sqrt l))) (sqrt (/ d (sqrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 43 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 1)) (sqrt (/ d l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 44 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt 1) (sqrt (/ d l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 45 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 46 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (/ (sqrt d) (sqrt l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 47 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (pow (/ d l) (/ 1 2)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 48 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 49 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (fabs (sqrt (/ d l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 50 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (fabs (/ (sqrt d) (sqrt l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 51 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* 1 (sqrt (/ d l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.553 * * * * [progress]: [ 52 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (posit16->real (real->posit16 (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 53 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (pow (/ d h) 1/2)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 54 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (pow (sqrt (/ d h)) 1)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 55 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (exp (log (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 56 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (log (exp (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 57 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 58 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (cbrt (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 59 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (* (cbrt (/ d h)) (cbrt (/ d h)))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 60 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 61 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h)))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 62 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h))) (sqrt (/ (cbrt d) (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 63 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 64 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h)))) (sqrt (/ (sqrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.554 * * * * [progress]: [ 65 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) (sqrt h))) (sqrt (/ (sqrt d) (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 66 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 67 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 68 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (sqrt h))) (sqrt (/ d (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 69 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 1)) (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 70 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt 1) (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 71 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt d) (sqrt (/ 1 h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 72 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (/ (sqrt d) (sqrt h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 73 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (pow (/ d h) (/ 1 2))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 74 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 75 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (fabs (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 76 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (fabs (/ (sqrt d) (sqrt h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 77 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* 1 (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.555 * * * * [progress]: [ 78 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (posit16->real (real->posit16 (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 79 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (pow (/ d h) 1/2)) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 80 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (pow (sqrt (/ d h)) 1)) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 81 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (exp (log (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 82 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (log (exp (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 83 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 84 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (cbrt (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 85 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (* (cbrt (/ d h)) (cbrt (/ d h)))) (sqrt (cbrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 86 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 87 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h)))) (sqrt (/ (cbrt d) (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 88 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h))) (sqrt (/ (cbrt d) (sqrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.556 * * * * [progress]: [ 89 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 90 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h)))) (sqrt (/ (sqrt d) (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 91 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) (sqrt h))) (sqrt (/ (sqrt d) (sqrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 92 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 93 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 94 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (sqrt h))) (sqrt (/ d (sqrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 95 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 1)) (sqrt (/ d h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 96 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt 1) (sqrt (/ d h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 97 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt d) (sqrt (/ 1 h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 98 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (/ (sqrt d) (sqrt h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 99 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (pow (/ d h) (/ 1 2))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 100 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 101 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (fabs (sqrt (/ d h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 102 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (fabs (/ (sqrt d) (sqrt h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.557 * * * * [progress]: [ 103 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* 1 (sqrt (/ d h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 104 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (posit16->real (real->posit16 (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 105 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* +nan.0 (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 106 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d)))))))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 107 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d)))))))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 108 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* +nan.0 (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 109 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d)))))))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 110 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d)))))))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 111 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* +nan.0 (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 112 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 113 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 114 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* +nan.0 (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 115 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.558 * * * * [progress]: [ 116 / 116 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
6.560 * [simplify]: Simplifying:
  (log (sqrt (/ d l)))
  (exp (sqrt (/ d l)))
  (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l))))
  (cbrt (sqrt (/ d l)))
  (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l)))
  (sqrt (* (cbrt (/ d l)) (cbrt (/ d l))))
  (sqrt (cbrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt l) (cbrt l))))
  (sqrt (/ (cbrt d) (cbrt l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt l)))
  (sqrt (/ (cbrt d) (sqrt l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) l))
  (sqrt (/ (sqrt d) (* (cbrt l) (cbrt l))))
  (sqrt (/ (sqrt d) (cbrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) l))
  (sqrt (/ 1 (* (cbrt l) (cbrt l))))
  (sqrt (/ d (cbrt l)))
  (sqrt (/ 1 (sqrt l)))
  (sqrt (/ d (sqrt l)))
  (sqrt (/ 1 1))
  (sqrt (/ d l))
  (sqrt 1)
  (sqrt (/ d l))
  (sqrt d)
  (sqrt (/ 1 l))
  (sqrt d)
  (sqrt l)
  (/ 1 2)
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (real->posit16 (sqrt (/ d l)))
  (log (sqrt (/ d l)))
  (exp (sqrt (/ d l)))
  (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l))))
  (cbrt (sqrt (/ d l)))
  (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l)))
  (sqrt (* (cbrt (/ d l)) (cbrt (/ d l))))
  (sqrt (cbrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt l) (cbrt l))))
  (sqrt (/ (cbrt d) (cbrt l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt l)))
  (sqrt (/ (cbrt d) (sqrt l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) l))
  (sqrt (/ (sqrt d) (* (cbrt l) (cbrt l))))
  (sqrt (/ (sqrt d) (cbrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) l))
  (sqrt (/ 1 (* (cbrt l) (cbrt l))))
  (sqrt (/ d (cbrt l)))
  (sqrt (/ 1 (sqrt l)))
  (sqrt (/ d (sqrt l)))
  (sqrt (/ 1 1))
  (sqrt (/ d l))
  (sqrt 1)
  (sqrt (/ d l))
  (sqrt d)
  (sqrt (/ 1 l))
  (sqrt d)
  (sqrt l)
  (/ 1 2)
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (real->posit16 (sqrt (/ d l)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))
  (sqrt (* (cbrt (/ d h)) (cbrt (/ d h))))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  (sqrt (/ 1 1))
  (sqrt (/ d h))
  (sqrt 1)
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  (/ 1 2)
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))
  (sqrt (* (cbrt (/ d h)) (cbrt (/ d h))))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  (sqrt (/ 1 1))
  (sqrt (/ d h))
  (sqrt 1)
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  (/ 1 2)
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (* +nan.0 (/ d l))
  (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
  (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
  (* +nan.0 (/ d l))
  (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
  (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
  (* +nan.0 (/ d h))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (* +nan.0 (/ d h))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
6.561 * * [simplify]: iteration 1: (139 enodes)
6.597 * * [simplify]: iteration 2: (507 enodes)
6.695 * * [simplify]: iteration 3: (848 enodes)
6.967 * * [simplify]: iteration 4: (1759 enodes)
7.966 * * [simplify]: Extracting #0: cost 59 inf + 0
7.967 * * [simplify]: Extracting #1: cost 218 inf + 2
7.969 * * [simplify]: Extracting #2: cost 777 inf + 2951
7.985 * * [simplify]: Extracting #3: cost 877 inf + 39658
8.056 * * [simplify]: Extracting #4: cost 313 inf + 157262
8.146 * * [simplify]: Extracting #5: cost 70 inf + 226484
8.210 * * [simplify]: Extracting #6: cost 3 inf + 255916
8.274 * * [simplify]: Extracting #7: cost 0 inf + 256643
8.373 * [simplify]: Simplified to:
  (log (sqrt (/ d l)))
  (exp (sqrt (/ d l)))
  (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l))))
  (cbrt (sqrt (/ d l)))
  (* (/ d l) (sqrt (/ d l)))
  (fabs (cbrt (/ d l)))
  (sqrt (cbrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (fabs (/ (cbrt d) (cbrt l)))
  (sqrt (/ (cbrt d) (cbrt l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt l)))
  (sqrt (/ (cbrt d) (sqrt l)))
  (fabs (cbrt d))
  (sqrt (/ (cbrt d) l))
  (sqrt (/ (sqrt d) (* (cbrt l) (cbrt l))))
  (sqrt (/ (sqrt d) (cbrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) l))
  (sqrt (/ 1 (* (cbrt l) (cbrt l))))
  (sqrt (/ d (cbrt l)))
  (sqrt (/ 1 (sqrt l)))
  (sqrt (/ d (sqrt l)))
  1
  (sqrt (/ d l))
  1
  (sqrt (/ d l))
  (sqrt d)
  (sqrt (/ 1 l))
  (sqrt d)
  (sqrt l)
  1/2
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (real->posit16 (sqrt (/ d l)))
  (log (sqrt (/ d l)))
  (exp (sqrt (/ d l)))
  (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l))))
  (cbrt (sqrt (/ d l)))
  (* (/ d l) (sqrt (/ d l)))
  (fabs (cbrt (/ d l)))
  (sqrt (cbrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (fabs (/ (cbrt d) (cbrt l)))
  (sqrt (/ (cbrt d) (cbrt l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt l)))
  (sqrt (/ (cbrt d) (sqrt l)))
  (fabs (cbrt d))
  (sqrt (/ (cbrt d) l))
  (sqrt (/ (sqrt d) (* (cbrt l) (cbrt l))))
  (sqrt (/ (sqrt d) (cbrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) l))
  (sqrt (/ 1 (* (cbrt l) (cbrt l))))
  (sqrt (/ d (cbrt l)))
  (sqrt (/ 1 (sqrt l)))
  (sqrt (/ d (sqrt l)))
  1
  (sqrt (/ d l))
  1
  (sqrt (/ d l))
  (sqrt d)
  (sqrt (/ 1 l))
  (sqrt d)
  (sqrt l)
  1/2
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (real->posit16 (sqrt (/ d l)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (sqrt (/ d h)) (/ d h))
  (fabs (cbrt (/ d h)))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (fabs (/ (cbrt d) (cbrt h)))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (fabs (cbrt d))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (/ (sqrt d) (cbrt h)) (cbrt h)))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ (/ 1 (cbrt h)) (cbrt h)))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  1
  (sqrt (/ d h))
  1
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  1/2
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (sqrt (/ d h)) (/ d h))
  (fabs (cbrt (/ d h)))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (fabs (/ (cbrt d) (cbrt h)))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (fabs (cbrt d))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (/ (sqrt d) (cbrt h)) (cbrt h)))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ (/ 1 (cbrt h)) (cbrt h)))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  1
  (sqrt (/ d h))
  1
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  1/2
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (* (/ d l) +nan.0)
  (+ (+ (/ (/ (- (/ +nan.0 l)) d) l) (/ (- (/ +nan.0 l)) (* (* d l) (* d l)))) (/ +nan.0 l))
  (+ (+ (/ (/ (- (/ +nan.0 l)) d) l) (/ (- (/ +nan.0 l)) (* (* d l) (* d l)))) (/ +nan.0 l))
  (* (/ d l) +nan.0)
  (+ (+ (/ (/ (- (/ +nan.0 l)) d) l) (/ (- (/ +nan.0 l)) (* (* d l) (* d l)))) (/ +nan.0 l))
  (+ (+ (/ (/ (- (/ +nan.0 l)) d) l) (/ (- (/ +nan.0 l)) (* (* d l) (* d l)))) (/ +nan.0 l))
  (/ (* d +nan.0) h)
  (- (- (/ (/ (/ +nan.0 h) h) d) (/ +nan.0 h)) (/ (/ (/ (/ (/ +nan.0 h) h) d) d) h))
  (- (- (/ (/ (/ +nan.0 h) h) d) (/ +nan.0 h)) (/ (/ (/ (/ (/ +nan.0 h) h) d) d) h))
  (/ (* d +nan.0) h)
  (- (- (/ (/ (/ +nan.0 h) h) d) (/ +nan.0 h)) (/ (/ (/ (/ (/ +nan.0 h) h) d) d) h))
  (- (- (/ (/ (/ +nan.0 h) h) d) (/ +nan.0 h)) (/ (/ (/ (/ (/ +nan.0 h) h) d) d) h))
8.409 * * * [progress]: adding candidates to table
10.498 * * [progress]: iteration 2 / 4
10.498 * * * [progress]: picking best candidate
10.680 * * * * [pick]: Picked  #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
10.680 * * * [progress]: localizing error
10.772 * * * [progress]: generating rewritten candidates
10.773 * * * * [progress]: [ 1 / 4 ] rewriting at (2 2 1 1 1)
10.775 * * * * [progress]: [ 2 / 4 ] rewriting at (2 2 1 1 2)
10.776 * * * * [progress]: [ 3 / 4 ] rewriting at (2 1 2)
10.778 * * * * [progress]: [ 4 / 4 ] rewriting at (2 2 1)
10.988 * * * [progress]: generating series expansions
10.988 * * * * [progress]: [ 1 / 4 ] generating series at (2 2 1 1 1)
10.988 * [backup-simplify]: Simplify (sqrt (/ d l)) into (sqrt (/ d l))
10.988 * [approximate]: Taking taylor expansion of (sqrt (/ d l)) in (d l) around 0
10.988 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in l
10.988 * [taylor]: Taking taylor expansion of (/ d l) in l
10.988 * [taylor]: Taking taylor expansion of d in l
10.988 * [backup-simplify]: Simplify d into d
10.988 * [taylor]: Taking taylor expansion of l in l
10.988 * [backup-simplify]: Simplify 0 into 0
10.988 * [backup-simplify]: Simplify 1 into 1
10.988 * [backup-simplify]: Simplify (/ d 1) into d
10.989 * [backup-simplify]: Simplify (sqrt 0) into 0
10.989 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
10.989 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in d
10.989 * [taylor]: Taking taylor expansion of (/ d l) in d
10.989 * [taylor]: Taking taylor expansion of d in d
10.989 * [backup-simplify]: Simplify 0 into 0
10.990 * [backup-simplify]: Simplify 1 into 1
10.990 * [taylor]: Taking taylor expansion of l in d
10.990 * [backup-simplify]: Simplify l into l
10.990 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
10.990 * [backup-simplify]: Simplify (sqrt 0) into 0
10.990 * [backup-simplify]: Simplify (/ (/ 1 l) (* 2 (sqrt 0))) into (/ +nan.0 l)
10.990 * [taylor]: Taking taylor expansion of (sqrt (/ d l)) in d
10.990 * [taylor]: Taking taylor expansion of (/ d l) in d
10.990 * [taylor]: Taking taylor expansion of d in d
10.990 * [backup-simplify]: Simplify 0 into 0
10.990 * [backup-simplify]: Simplify 1 into 1
10.990 * [taylor]: Taking taylor expansion of l in d
10.990 * [backup-simplify]: Simplify l into l
10.990 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
10.991 * [backup-simplify]: Simplify (sqrt 0) into 0
10.991 * [backup-simplify]: Simplify (/ (/ 1 l) (* 2 (sqrt 0))) into (/ +nan.0 l)
10.991 * [taylor]: Taking taylor expansion of 0 in l
10.991 * [backup-simplify]: Simplify 0 into 0
10.991 * [taylor]: Taking taylor expansion of (/ +nan.0 l) in l
10.991 * [taylor]: Taking taylor expansion of +nan.0 in l
10.991 * [backup-simplify]: Simplify +nan.0 into +nan.0
10.991 * [taylor]: Taking taylor expansion of l in l
10.991 * [backup-simplify]: Simplify 0 into 0
10.991 * [backup-simplify]: Simplify 1 into 1
10.992 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
10.992 * [backup-simplify]: Simplify +nan.0 into +nan.0
10.992 * [backup-simplify]: Simplify 0 into 0
10.992 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ 1 l) (/ 0 l)))) into 0
10.992 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 l) 2) (+)) (* 2 0)) into (/ +nan.0 (pow l 2))
10.992 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow l 2)) in l
10.992 * [taylor]: Taking taylor expansion of +nan.0 in l
10.992 * [backup-simplify]: Simplify +nan.0 into +nan.0
10.992 * [taylor]: Taking taylor expansion of (pow l 2) in l
10.993 * [taylor]: Taking taylor expansion of l in l
10.993 * [backup-simplify]: Simplify 0 into 0
10.993 * [backup-simplify]: Simplify 1 into 1
10.993 * [backup-simplify]: Simplify (* 1 1) into 1
10.993 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
10.993 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
10.994 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
10.994 * [backup-simplify]: Simplify 0 into 0
10.995 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
10.995 * [backup-simplify]: Simplify 0 into 0
10.995 * [backup-simplify]: Simplify 0 into 0
10.995 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ 1 l) (/ 0 l)) (* 0 (/ 0 l)))) into 0
10.995 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 l) (/ +nan.0 (pow l 2)))))) (* 2 0)) into (/ +nan.0 (pow l 3))
10.995 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow l 3)) in l
10.995 * [taylor]: Taking taylor expansion of +nan.0 in l
10.995 * [backup-simplify]: Simplify +nan.0 into +nan.0
10.995 * [taylor]: Taking taylor expansion of (pow l 3) in l
10.995 * [taylor]: Taking taylor expansion of l in l
10.995 * [backup-simplify]: Simplify 0 into 0
10.995 * [backup-simplify]: Simplify 1 into 1
10.996 * [backup-simplify]: Simplify (* 1 1) into 1
10.996 * [backup-simplify]: Simplify (* 1 1) into 1
10.996 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
10.997 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
10.997 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
10.998 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
10.998 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
10.999 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
10.999 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
10.999 * [backup-simplify]: Simplify 0 into 0
11.000 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.001 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.001 * [backup-simplify]: Simplify 0 into 0
11.001 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 l) d)) into (* +nan.0 (/ d l))
11.001 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 l))) into (sqrt (/ l d))
11.001 * [approximate]: Taking taylor expansion of (sqrt (/ l d)) in (d l) around 0
11.001 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in l
11.001 * [taylor]: Taking taylor expansion of (/ l d) in l
11.001 * [taylor]: Taking taylor expansion of l in l
11.001 * [backup-simplify]: Simplify 0 into 0
11.001 * [backup-simplify]: Simplify 1 into 1
11.001 * [taylor]: Taking taylor expansion of d in l
11.001 * [backup-simplify]: Simplify d into d
11.001 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
11.001 * [backup-simplify]: Simplify (sqrt 0) into 0
11.002 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
11.002 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
11.002 * [taylor]: Taking taylor expansion of (/ l d) in d
11.002 * [taylor]: Taking taylor expansion of l in d
11.002 * [backup-simplify]: Simplify l into l
11.002 * [taylor]: Taking taylor expansion of d in d
11.002 * [backup-simplify]: Simplify 0 into 0
11.002 * [backup-simplify]: Simplify 1 into 1
11.002 * [backup-simplify]: Simplify (/ l 1) into l
11.002 * [backup-simplify]: Simplify (sqrt 0) into 0
11.002 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
11.002 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
11.002 * [taylor]: Taking taylor expansion of (/ l d) in d
11.002 * [taylor]: Taking taylor expansion of l in d
11.002 * [backup-simplify]: Simplify l into l
11.002 * [taylor]: Taking taylor expansion of d in d
11.003 * [backup-simplify]: Simplify 0 into 0
11.003 * [backup-simplify]: Simplify 1 into 1
11.003 * [backup-simplify]: Simplify (/ l 1) into l
11.003 * [backup-simplify]: Simplify (sqrt 0) into 0
11.003 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
11.003 * [taylor]: Taking taylor expansion of 0 in l
11.003 * [backup-simplify]: Simplify 0 into 0
11.003 * [backup-simplify]: Simplify 0 into 0
11.003 * [taylor]: Taking taylor expansion of (* +nan.0 l) in l
11.003 * [taylor]: Taking taylor expansion of +nan.0 in l
11.003 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.003 * [taylor]: Taking taylor expansion of l in l
11.003 * [backup-simplify]: Simplify 0 into 0
11.003 * [backup-simplify]: Simplify 1 into 1
11.004 * [backup-simplify]: Simplify (* +nan.0 0) into 0
11.004 * [backup-simplify]: Simplify 0 into 0
11.004 * [backup-simplify]: Simplify 0 into 0
11.004 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)))) into 0
11.005 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 l) 2) (+)) (* 2 0)) into (* +nan.0 (pow l 2))
11.005 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 2)) in l
11.005 * [taylor]: Taking taylor expansion of +nan.0 in l
11.005 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.005 * [taylor]: Taking taylor expansion of (pow l 2) in l
11.005 * [taylor]: Taking taylor expansion of l in l
11.005 * [backup-simplify]: Simplify 0 into 0
11.005 * [backup-simplify]: Simplify 1 into 1
11.006 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
11.006 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.006 * [backup-simplify]: Simplify 0 into 0
11.007 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.007 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 2)))))) (* 2 0)) into (* +nan.0 (pow l 3))
11.007 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 3)) in l
11.007 * [taylor]: Taking taylor expansion of +nan.0 in l
11.007 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.007 * [taylor]: Taking taylor expansion of (pow l 3) in l
11.007 * [taylor]: Taking taylor expansion of l in l
11.007 * [backup-simplify]: Simplify 0 into 0
11.007 * [backup-simplify]: Simplify 1 into 1
11.008 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
11.008 * [backup-simplify]: Simplify 0 into 0
11.009 * [backup-simplify]: Simplify 0 into 0
11.010 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.011 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 2)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 4))
11.011 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 4)) in l
11.011 * [taylor]: Taking taylor expansion of +nan.0 in l
11.011 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.011 * [taylor]: Taking taylor expansion of (pow l 4) in l
11.011 * [taylor]: Taking taylor expansion of l in l
11.011 * [backup-simplify]: Simplify 0 into 0
11.011 * [backup-simplify]: Simplify 1 into 1
11.012 * [backup-simplify]: Simplify (* 1 1) into 1
11.012 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.012 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.013 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
11.013 * [backup-simplify]: Simplify 0 into 0
11.014 * [backup-simplify]: Simplify 0 into 0
11.016 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.017 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 4)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 5))
11.017 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 5)) in l
11.017 * [taylor]: Taking taylor expansion of +nan.0 in l
11.017 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.017 * [taylor]: Taking taylor expansion of (pow l 5) in l
11.017 * [taylor]: Taking taylor expansion of l in l
11.017 * [backup-simplify]: Simplify 0 into 0
11.017 * [backup-simplify]: Simplify 1 into 1
11.018 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.019 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
11.019 * [backup-simplify]: Simplify 0 into 0
11.020 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
11.020 * [backup-simplify]: Simplify 0 into 0
11.020 * [backup-simplify]: Simplify 0 into 0
11.023 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.024 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 3)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 5)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 4)))))) (* 2 0)) into (* +nan.0 (pow l 6))
11.024 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 6)) in l
11.024 * [taylor]: Taking taylor expansion of +nan.0 in l
11.024 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.024 * [taylor]: Taking taylor expansion of (pow l 6) in l
11.024 * [taylor]: Taking taylor expansion of l in l
11.024 * [backup-simplify]: Simplify 0 into 0
11.024 * [backup-simplify]: Simplify 1 into 1
11.025 * [backup-simplify]: Simplify (* 1 1) into 1
11.025 * [backup-simplify]: Simplify (* 1 1) into 1
11.026 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.026 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.026 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 l) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 l) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 l) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
11.027 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- l)))) into (sqrt (/ l d))
11.027 * [approximate]: Taking taylor expansion of (sqrt (/ l d)) in (d l) around 0
11.027 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in l
11.027 * [taylor]: Taking taylor expansion of (/ l d) in l
11.027 * [taylor]: Taking taylor expansion of l in l
11.027 * [backup-simplify]: Simplify 0 into 0
11.027 * [backup-simplify]: Simplify 1 into 1
11.027 * [taylor]: Taking taylor expansion of d in l
11.027 * [backup-simplify]: Simplify d into d
11.027 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
11.027 * [backup-simplify]: Simplify (sqrt 0) into 0
11.028 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
11.028 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
11.028 * [taylor]: Taking taylor expansion of (/ l d) in d
11.028 * [taylor]: Taking taylor expansion of l in d
11.028 * [backup-simplify]: Simplify l into l
11.028 * [taylor]: Taking taylor expansion of d in d
11.028 * [backup-simplify]: Simplify 0 into 0
11.028 * [backup-simplify]: Simplify 1 into 1
11.028 * [backup-simplify]: Simplify (/ l 1) into l
11.028 * [backup-simplify]: Simplify (sqrt 0) into 0
11.029 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
11.029 * [taylor]: Taking taylor expansion of (sqrt (/ l d)) in d
11.029 * [taylor]: Taking taylor expansion of (/ l d) in d
11.029 * [taylor]: Taking taylor expansion of l in d
11.029 * [backup-simplify]: Simplify l into l
11.029 * [taylor]: Taking taylor expansion of d in d
11.029 * [backup-simplify]: Simplify 0 into 0
11.029 * [backup-simplify]: Simplify 1 into 1
11.029 * [backup-simplify]: Simplify (/ l 1) into l
11.030 * [backup-simplify]: Simplify (sqrt 0) into 0
11.030 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
11.030 * [taylor]: Taking taylor expansion of 0 in l
11.030 * [backup-simplify]: Simplify 0 into 0
11.030 * [backup-simplify]: Simplify 0 into 0
11.030 * [taylor]: Taking taylor expansion of (* +nan.0 l) in l
11.030 * [taylor]: Taking taylor expansion of +nan.0 in l
11.030 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.031 * [taylor]: Taking taylor expansion of l in l
11.031 * [backup-simplify]: Simplify 0 into 0
11.031 * [backup-simplify]: Simplify 1 into 1
11.031 * [backup-simplify]: Simplify (* +nan.0 0) into 0
11.031 * [backup-simplify]: Simplify 0 into 0
11.031 * [backup-simplify]: Simplify 0 into 0
11.032 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)))) into 0
11.033 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 l) 2) (+)) (* 2 0)) into (* +nan.0 (pow l 2))
11.033 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 2)) in l
11.033 * [taylor]: Taking taylor expansion of +nan.0 in l
11.033 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.033 * [taylor]: Taking taylor expansion of (pow l 2) in l
11.033 * [taylor]: Taking taylor expansion of l in l
11.033 * [backup-simplify]: Simplify 0 into 0
11.034 * [backup-simplify]: Simplify 1 into 1
11.035 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
11.035 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.035 * [backup-simplify]: Simplify 0 into 0
11.037 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.037 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 2)))))) (* 2 0)) into (* +nan.0 (pow l 3))
11.037 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 3)) in l
11.038 * [taylor]: Taking taylor expansion of +nan.0 in l
11.038 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.038 * [taylor]: Taking taylor expansion of (pow l 3) in l
11.038 * [taylor]: Taking taylor expansion of l in l
11.038 * [backup-simplify]: Simplify 0 into 0
11.038 * [backup-simplify]: Simplify 1 into 1
11.039 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
11.039 * [backup-simplify]: Simplify 0 into 0
11.039 * [backup-simplify]: Simplify 0 into 0
11.041 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.042 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 2)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 4))
11.042 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 4)) in l
11.042 * [taylor]: Taking taylor expansion of +nan.0 in l
11.042 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.042 * [taylor]: Taking taylor expansion of (pow l 4) in l
11.042 * [taylor]: Taking taylor expansion of l in l
11.042 * [backup-simplify]: Simplify 0 into 0
11.042 * [backup-simplify]: Simplify 1 into 1
11.042 * [backup-simplify]: Simplify (* 1 1) into 1
11.043 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.043 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.044 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
11.044 * [backup-simplify]: Simplify 0 into 0
11.044 * [backup-simplify]: Simplify 0 into 0
11.046 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.047 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 4)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 3)))))) (* 2 0)) into (* +nan.0 (pow l 5))
11.047 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 5)) in l
11.047 * [taylor]: Taking taylor expansion of +nan.0 in l
11.047 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.047 * [taylor]: Taking taylor expansion of (pow l 5) in l
11.047 * [taylor]: Taking taylor expansion of l in l
11.047 * [backup-simplify]: Simplify 0 into 0
11.047 * [backup-simplify]: Simplify 1 into 1
11.048 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.049 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
11.049 * [backup-simplify]: Simplify 0 into 0
11.050 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
11.050 * [backup-simplify]: Simplify 0 into 0
11.050 * [backup-simplify]: Simplify 0 into 0
11.053 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* l (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.054 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow l 3)) 2) (+ (* 2 (* (* +nan.0 l) (* +nan.0 (pow l 5)))) (* 2 (* (* +nan.0 (pow l 2)) (* +nan.0 (pow l 4)))))) (* 2 0)) into (* +nan.0 (pow l 6))
11.055 * [taylor]: Taking taylor expansion of (* +nan.0 (pow l 6)) in l
11.055 * [taylor]: Taking taylor expansion of +nan.0 in l
11.055 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.055 * [taylor]: Taking taylor expansion of (pow l 6) in l
11.055 * [taylor]: Taking taylor expansion of l in l
11.055 * [backup-simplify]: Simplify 0 into 0
11.055 * [backup-simplify]: Simplify 1 into 1
11.055 * [backup-simplify]: Simplify (* 1 1) into 1
11.055 * [backup-simplify]: Simplify (* 1 1) into 1
11.056 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.056 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.057 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- l)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- l)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- l)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
11.057 * * * * [progress]: [ 2 / 4 ] generating series at (2 2 1 1 2)
11.057 * [backup-simplify]: Simplify (sqrt (/ d h)) into (sqrt (/ d h))
11.057 * [approximate]: Taking taylor expansion of (sqrt (/ d h)) in (d h) around 0
11.057 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in h
11.057 * [taylor]: Taking taylor expansion of (/ d h) in h
11.057 * [taylor]: Taking taylor expansion of d in h
11.057 * [backup-simplify]: Simplify d into d
11.058 * [taylor]: Taking taylor expansion of h in h
11.058 * [backup-simplify]: Simplify 0 into 0
11.058 * [backup-simplify]: Simplify 1 into 1
11.058 * [backup-simplify]: Simplify (/ d 1) into d
11.058 * [backup-simplify]: Simplify (sqrt 0) into 0
11.059 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
11.059 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
11.059 * [taylor]: Taking taylor expansion of (/ d h) in d
11.059 * [taylor]: Taking taylor expansion of d in d
11.059 * [backup-simplify]: Simplify 0 into 0
11.059 * [backup-simplify]: Simplify 1 into 1
11.059 * [taylor]: Taking taylor expansion of h in d
11.059 * [backup-simplify]: Simplify h into h
11.059 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
11.059 * [backup-simplify]: Simplify (sqrt 0) into 0
11.060 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
11.060 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
11.060 * [taylor]: Taking taylor expansion of (/ d h) in d
11.060 * [taylor]: Taking taylor expansion of d in d
11.060 * [backup-simplify]: Simplify 0 into 0
11.060 * [backup-simplify]: Simplify 1 into 1
11.060 * [taylor]: Taking taylor expansion of h in d
11.060 * [backup-simplify]: Simplify h into h
11.060 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
11.061 * [backup-simplify]: Simplify (sqrt 0) into 0
11.061 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
11.061 * [taylor]: Taking taylor expansion of 0 in h
11.061 * [backup-simplify]: Simplify 0 into 0
11.061 * [taylor]: Taking taylor expansion of (/ +nan.0 h) in h
11.061 * [taylor]: Taking taylor expansion of +nan.0 in h
11.061 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.061 * [taylor]: Taking taylor expansion of h in h
11.061 * [backup-simplify]: Simplify 0 into 0
11.061 * [backup-simplify]: Simplify 1 into 1
11.062 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
11.062 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.062 * [backup-simplify]: Simplify 0 into 0
11.062 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
11.063 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
11.063 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 2)) in h
11.063 * [taylor]: Taking taylor expansion of +nan.0 in h
11.063 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.063 * [taylor]: Taking taylor expansion of (pow h 2) in h
11.063 * [taylor]: Taking taylor expansion of h in h
11.063 * [backup-simplify]: Simplify 0 into 0
11.063 * [backup-simplify]: Simplify 1 into 1
11.064 * [backup-simplify]: Simplify (* 1 1) into 1
11.064 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
11.065 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.066 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
11.066 * [backup-simplify]: Simplify 0 into 0
11.067 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
11.067 * [backup-simplify]: Simplify 0 into 0
11.067 * [backup-simplify]: Simplify 0 into 0
11.067 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.068 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
11.068 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 3)) in h
11.068 * [taylor]: Taking taylor expansion of +nan.0 in h
11.068 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.068 * [taylor]: Taking taylor expansion of (pow h 3) in h
11.068 * [taylor]: Taking taylor expansion of h in h
11.068 * [backup-simplify]: Simplify 0 into 0
11.068 * [backup-simplify]: Simplify 1 into 1
11.068 * [backup-simplify]: Simplify (* 1 1) into 1
11.069 * [backup-simplify]: Simplify (* 1 1) into 1
11.069 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
11.070 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.077 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.079 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.080 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.081 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
11.082 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.082 * [backup-simplify]: Simplify 0 into 0
11.083 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.084 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.084 * [backup-simplify]: Simplify 0 into 0
11.084 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 h) d)) into (* +nan.0 (/ d h))
11.084 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 h))) into (sqrt (/ h d))
11.084 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
11.084 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
11.084 * [taylor]: Taking taylor expansion of (/ h d) in h
11.084 * [taylor]: Taking taylor expansion of h in h
11.084 * [backup-simplify]: Simplify 0 into 0
11.084 * [backup-simplify]: Simplify 1 into 1
11.084 * [taylor]: Taking taylor expansion of d in h
11.084 * [backup-simplify]: Simplify d into d
11.084 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
11.085 * [backup-simplify]: Simplify (sqrt 0) into 0
11.086 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
11.086 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
11.086 * [taylor]: Taking taylor expansion of (/ h d) in d
11.086 * [taylor]: Taking taylor expansion of h in d
11.086 * [backup-simplify]: Simplify h into h
11.086 * [taylor]: Taking taylor expansion of d in d
11.086 * [backup-simplify]: Simplify 0 into 0
11.086 * [backup-simplify]: Simplify 1 into 1
11.086 * [backup-simplify]: Simplify (/ h 1) into h
11.086 * [backup-simplify]: Simplify (sqrt 0) into 0
11.087 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.087 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
11.087 * [taylor]: Taking taylor expansion of (/ h d) in d
11.087 * [taylor]: Taking taylor expansion of h in d
11.087 * [backup-simplify]: Simplify h into h
11.087 * [taylor]: Taking taylor expansion of d in d
11.087 * [backup-simplify]: Simplify 0 into 0
11.087 * [backup-simplify]: Simplify 1 into 1
11.087 * [backup-simplify]: Simplify (/ h 1) into h
11.088 * [backup-simplify]: Simplify (sqrt 0) into 0
11.088 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.088 * [taylor]: Taking taylor expansion of 0 in h
11.088 * [backup-simplify]: Simplify 0 into 0
11.088 * [backup-simplify]: Simplify 0 into 0
11.088 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
11.088 * [taylor]: Taking taylor expansion of +nan.0 in h
11.089 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.089 * [taylor]: Taking taylor expansion of h in h
11.089 * [backup-simplify]: Simplify 0 into 0
11.089 * [backup-simplify]: Simplify 1 into 1
11.089 * [backup-simplify]: Simplify (* +nan.0 0) into 0
11.089 * [backup-simplify]: Simplify 0 into 0
11.089 * [backup-simplify]: Simplify 0 into 0
11.090 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
11.091 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
11.091 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
11.091 * [taylor]: Taking taylor expansion of +nan.0 in h
11.091 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.091 * [taylor]: Taking taylor expansion of (pow h 2) in h
11.091 * [taylor]: Taking taylor expansion of h in h
11.091 * [backup-simplify]: Simplify 0 into 0
11.091 * [backup-simplify]: Simplify 1 into 1
11.093 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
11.093 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.093 * [backup-simplify]: Simplify 0 into 0
11.095 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.096 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
11.096 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
11.096 * [taylor]: Taking taylor expansion of +nan.0 in h
11.096 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.096 * [taylor]: Taking taylor expansion of (pow h 3) in h
11.096 * [taylor]: Taking taylor expansion of h in h
11.096 * [backup-simplify]: Simplify 0 into 0
11.096 * [backup-simplify]: Simplify 1 into 1
11.097 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
11.097 * [backup-simplify]: Simplify 0 into 0
11.097 * [backup-simplify]: Simplify 0 into 0
11.099 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.100 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
11.100 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
11.100 * [taylor]: Taking taylor expansion of +nan.0 in h
11.100 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.100 * [taylor]: Taking taylor expansion of (pow h 4) in h
11.100 * [taylor]: Taking taylor expansion of h in h
11.100 * [backup-simplify]: Simplify 0 into 0
11.100 * [backup-simplify]: Simplify 1 into 1
11.100 * [backup-simplify]: Simplify (* 1 1) into 1
11.101 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.101 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.102 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
11.102 * [backup-simplify]: Simplify 0 into 0
11.102 * [backup-simplify]: Simplify 0 into 0
11.104 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.105 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
11.105 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
11.105 * [taylor]: Taking taylor expansion of +nan.0 in h
11.105 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.105 * [taylor]: Taking taylor expansion of (pow h 5) in h
11.105 * [taylor]: Taking taylor expansion of h in h
11.105 * [backup-simplify]: Simplify 0 into 0
11.106 * [backup-simplify]: Simplify 1 into 1
11.106 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.107 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
11.107 * [backup-simplify]: Simplify 0 into 0
11.108 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
11.108 * [backup-simplify]: Simplify 0 into 0
11.108 * [backup-simplify]: Simplify 0 into 0
11.111 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.112 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
11.113 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
11.113 * [taylor]: Taking taylor expansion of +nan.0 in h
11.113 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.113 * [taylor]: Taking taylor expansion of (pow h 6) in h
11.113 * [taylor]: Taking taylor expansion of h in h
11.113 * [backup-simplify]: Simplify 0 into 0
11.113 * [backup-simplify]: Simplify 1 into 1
11.113 * [backup-simplify]: Simplify (* 1 1) into 1
11.114 * [backup-simplify]: Simplify (* 1 1) into 1
11.114 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.114 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.115 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 h) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 h) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 h) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
11.115 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- h)))) into (sqrt (/ h d))
11.115 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
11.115 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
11.115 * [taylor]: Taking taylor expansion of (/ h d) in h
11.115 * [taylor]: Taking taylor expansion of h in h
11.115 * [backup-simplify]: Simplify 0 into 0
11.115 * [backup-simplify]: Simplify 1 into 1
11.115 * [taylor]: Taking taylor expansion of d in h
11.115 * [backup-simplify]: Simplify d into d
11.115 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
11.116 * [backup-simplify]: Simplify (sqrt 0) into 0
11.116 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
11.116 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
11.116 * [taylor]: Taking taylor expansion of (/ h d) in d
11.116 * [taylor]: Taking taylor expansion of h in d
11.116 * [backup-simplify]: Simplify h into h
11.117 * [taylor]: Taking taylor expansion of d in d
11.117 * [backup-simplify]: Simplify 0 into 0
11.117 * [backup-simplify]: Simplify 1 into 1
11.117 * [backup-simplify]: Simplify (/ h 1) into h
11.117 * [backup-simplify]: Simplify (sqrt 0) into 0
11.118 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.118 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
11.118 * [taylor]: Taking taylor expansion of (/ h d) in d
11.118 * [taylor]: Taking taylor expansion of h in d
11.118 * [backup-simplify]: Simplify h into h
11.118 * [taylor]: Taking taylor expansion of d in d
11.118 * [backup-simplify]: Simplify 0 into 0
11.118 * [backup-simplify]: Simplify 1 into 1
11.118 * [backup-simplify]: Simplify (/ h 1) into h
11.118 * [backup-simplify]: Simplify (sqrt 0) into 0
11.119 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.119 * [taylor]: Taking taylor expansion of 0 in h
11.119 * [backup-simplify]: Simplify 0 into 0
11.119 * [backup-simplify]: Simplify 0 into 0
11.119 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
11.119 * [taylor]: Taking taylor expansion of +nan.0 in h
11.119 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.119 * [taylor]: Taking taylor expansion of h in h
11.119 * [backup-simplify]: Simplify 0 into 0
11.119 * [backup-simplify]: Simplify 1 into 1
11.120 * [backup-simplify]: Simplify (* +nan.0 0) into 0
11.120 * [backup-simplify]: Simplify 0 into 0
11.120 * [backup-simplify]: Simplify 0 into 0
11.121 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
11.121 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
11.122 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
11.122 * [taylor]: Taking taylor expansion of +nan.0 in h
11.122 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.122 * [taylor]: Taking taylor expansion of (pow h 2) in h
11.122 * [taylor]: Taking taylor expansion of h in h
11.122 * [backup-simplify]: Simplify 0 into 0
11.122 * [backup-simplify]: Simplify 1 into 1
11.123 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
11.124 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.124 * [backup-simplify]: Simplify 0 into 0
11.125 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.126 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
11.126 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
11.126 * [taylor]: Taking taylor expansion of +nan.0 in h
11.126 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.126 * [taylor]: Taking taylor expansion of (pow h 3) in h
11.126 * [taylor]: Taking taylor expansion of h in h
11.126 * [backup-simplify]: Simplify 0 into 0
11.126 * [backup-simplify]: Simplify 1 into 1
11.127 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
11.127 * [backup-simplify]: Simplify 0 into 0
11.127 * [backup-simplify]: Simplify 0 into 0
11.129 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.130 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
11.130 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
11.130 * [taylor]: Taking taylor expansion of +nan.0 in h
11.130 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.130 * [taylor]: Taking taylor expansion of (pow h 4) in h
11.130 * [taylor]: Taking taylor expansion of h in h
11.130 * [backup-simplify]: Simplify 0 into 0
11.130 * [backup-simplify]: Simplify 1 into 1
11.130 * [backup-simplify]: Simplify (* 1 1) into 1
11.131 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.131 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.132 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
11.132 * [backup-simplify]: Simplify 0 into 0
11.132 * [backup-simplify]: Simplify 0 into 0
11.135 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.136 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
11.136 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
11.136 * [taylor]: Taking taylor expansion of +nan.0 in h
11.136 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.136 * [taylor]: Taking taylor expansion of (pow h 5) in h
11.136 * [taylor]: Taking taylor expansion of h in h
11.136 * [backup-simplify]: Simplify 0 into 0
11.136 * [backup-simplify]: Simplify 1 into 1
11.136 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.137 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
11.137 * [backup-simplify]: Simplify 0 into 0
11.138 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
11.138 * [backup-simplify]: Simplify 0 into 0
11.139 * [backup-simplify]: Simplify 0 into 0
11.142 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.144 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
11.144 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
11.144 * [taylor]: Taking taylor expansion of +nan.0 in h
11.144 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.144 * [taylor]: Taking taylor expansion of (pow h 6) in h
11.144 * [taylor]: Taking taylor expansion of h in h
11.144 * [backup-simplify]: Simplify 0 into 0
11.144 * [backup-simplify]: Simplify 1 into 1
11.144 * [backup-simplify]: Simplify (* 1 1) into 1
11.145 * [backup-simplify]: Simplify (* 1 1) into 1
11.145 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.145 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.146 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- h)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- h)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- h)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
11.146 * * * * [progress]: [ 3 / 4 ] generating series at (2 1 2)
11.147 * [backup-simplify]: Simplify (sqrt (/ d h)) into (sqrt (/ d h))
11.147 * [approximate]: Taking taylor expansion of (sqrt (/ d h)) in (d h) around 0
11.147 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in h
11.147 * [taylor]: Taking taylor expansion of (/ d h) in h
11.147 * [taylor]: Taking taylor expansion of d in h
11.147 * [backup-simplify]: Simplify d into d
11.147 * [taylor]: Taking taylor expansion of h in h
11.147 * [backup-simplify]: Simplify 0 into 0
11.147 * [backup-simplify]: Simplify 1 into 1
11.147 * [backup-simplify]: Simplify (/ d 1) into d
11.147 * [backup-simplify]: Simplify (sqrt 0) into 0
11.148 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
11.148 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
11.148 * [taylor]: Taking taylor expansion of (/ d h) in d
11.148 * [taylor]: Taking taylor expansion of d in d
11.148 * [backup-simplify]: Simplify 0 into 0
11.148 * [backup-simplify]: Simplify 1 into 1
11.148 * [taylor]: Taking taylor expansion of h in d
11.148 * [backup-simplify]: Simplify h into h
11.148 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
11.148 * [backup-simplify]: Simplify (sqrt 0) into 0
11.149 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
11.149 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
11.149 * [taylor]: Taking taylor expansion of (/ d h) in d
11.149 * [taylor]: Taking taylor expansion of d in d
11.149 * [backup-simplify]: Simplify 0 into 0
11.149 * [backup-simplify]: Simplify 1 into 1
11.149 * [taylor]: Taking taylor expansion of h in d
11.149 * [backup-simplify]: Simplify h into h
11.149 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
11.150 * [backup-simplify]: Simplify (sqrt 0) into 0
11.150 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
11.150 * [taylor]: Taking taylor expansion of 0 in h
11.150 * [backup-simplify]: Simplify 0 into 0
11.150 * [taylor]: Taking taylor expansion of (/ +nan.0 h) in h
11.151 * [taylor]: Taking taylor expansion of +nan.0 in h
11.151 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.151 * [taylor]: Taking taylor expansion of h in h
11.151 * [backup-simplify]: Simplify 0 into 0
11.151 * [backup-simplify]: Simplify 1 into 1
11.151 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
11.151 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.151 * [backup-simplify]: Simplify 0 into 0
11.151 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
11.152 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
11.152 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 2)) in h
11.152 * [taylor]: Taking taylor expansion of +nan.0 in h
11.152 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.152 * [taylor]: Taking taylor expansion of (pow h 2) in h
11.152 * [taylor]: Taking taylor expansion of h in h
11.152 * [backup-simplify]: Simplify 0 into 0
11.152 * [backup-simplify]: Simplify 1 into 1
11.153 * [backup-simplify]: Simplify (* 1 1) into 1
11.153 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
11.154 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.155 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
11.155 * [backup-simplify]: Simplify 0 into 0
11.156 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
11.156 * [backup-simplify]: Simplify 0 into 0
11.156 * [backup-simplify]: Simplify 0 into 0
11.156 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.156 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
11.157 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 3)) in h
11.157 * [taylor]: Taking taylor expansion of +nan.0 in h
11.157 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.157 * [taylor]: Taking taylor expansion of (pow h 3) in h
11.157 * [taylor]: Taking taylor expansion of h in h
11.157 * [backup-simplify]: Simplify 0 into 0
11.157 * [backup-simplify]: Simplify 1 into 1
11.157 * [backup-simplify]: Simplify (* 1 1) into 1
11.157 * [backup-simplify]: Simplify (* 1 1) into 1
11.158 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
11.159 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.159 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.160 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.161 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.162 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
11.163 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.163 * [backup-simplify]: Simplify 0 into 0
11.163 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.164 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.164 * [backup-simplify]: Simplify 0 into 0
11.165 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 h) d)) into (* +nan.0 (/ d h))
11.165 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 h))) into (sqrt (/ h d))
11.165 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
11.165 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
11.165 * [taylor]: Taking taylor expansion of (/ h d) in h
11.165 * [taylor]: Taking taylor expansion of h in h
11.165 * [backup-simplify]: Simplify 0 into 0
11.165 * [backup-simplify]: Simplify 1 into 1
11.165 * [taylor]: Taking taylor expansion of d in h
11.165 * [backup-simplify]: Simplify d into d
11.165 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
11.165 * [backup-simplify]: Simplify (sqrt 0) into 0
11.166 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
11.166 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
11.166 * [taylor]: Taking taylor expansion of (/ h d) in d
11.166 * [taylor]: Taking taylor expansion of h in d
11.166 * [backup-simplify]: Simplify h into h
11.166 * [taylor]: Taking taylor expansion of d in d
11.166 * [backup-simplify]: Simplify 0 into 0
11.166 * [backup-simplify]: Simplify 1 into 1
11.166 * [backup-simplify]: Simplify (/ h 1) into h
11.166 * [backup-simplify]: Simplify (sqrt 0) into 0
11.167 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.167 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
11.167 * [taylor]: Taking taylor expansion of (/ h d) in d
11.167 * [taylor]: Taking taylor expansion of h in d
11.167 * [backup-simplify]: Simplify h into h
11.167 * [taylor]: Taking taylor expansion of d in d
11.167 * [backup-simplify]: Simplify 0 into 0
11.167 * [backup-simplify]: Simplify 1 into 1
11.167 * [backup-simplify]: Simplify (/ h 1) into h
11.168 * [backup-simplify]: Simplify (sqrt 0) into 0
11.168 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.168 * [taylor]: Taking taylor expansion of 0 in h
11.168 * [backup-simplify]: Simplify 0 into 0
11.168 * [backup-simplify]: Simplify 0 into 0
11.168 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
11.168 * [taylor]: Taking taylor expansion of +nan.0 in h
11.168 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.168 * [taylor]: Taking taylor expansion of h in h
11.168 * [backup-simplify]: Simplify 0 into 0
11.168 * [backup-simplify]: Simplify 1 into 1
11.169 * [backup-simplify]: Simplify (* +nan.0 0) into 0
11.169 * [backup-simplify]: Simplify 0 into 0
11.169 * [backup-simplify]: Simplify 0 into 0
11.170 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
11.171 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
11.171 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
11.171 * [taylor]: Taking taylor expansion of +nan.0 in h
11.171 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.171 * [taylor]: Taking taylor expansion of (pow h 2) in h
11.171 * [taylor]: Taking taylor expansion of h in h
11.171 * [backup-simplify]: Simplify 0 into 0
11.171 * [backup-simplify]: Simplify 1 into 1
11.173 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
11.173 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.174 * [backup-simplify]: Simplify 0 into 0
11.175 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.176 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
11.176 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
11.176 * [taylor]: Taking taylor expansion of +nan.0 in h
11.176 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.176 * [taylor]: Taking taylor expansion of (pow h 3) in h
11.176 * [taylor]: Taking taylor expansion of h in h
11.176 * [backup-simplify]: Simplify 0 into 0
11.176 * [backup-simplify]: Simplify 1 into 1
11.177 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
11.177 * [backup-simplify]: Simplify 0 into 0
11.177 * [backup-simplify]: Simplify 0 into 0
11.179 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.180 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
11.180 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
11.180 * [taylor]: Taking taylor expansion of +nan.0 in h
11.180 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.180 * [taylor]: Taking taylor expansion of (pow h 4) in h
11.180 * [taylor]: Taking taylor expansion of h in h
11.180 * [backup-simplify]: Simplify 0 into 0
11.180 * [backup-simplify]: Simplify 1 into 1
11.181 * [backup-simplify]: Simplify (* 1 1) into 1
11.181 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.181 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.182 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
11.182 * [backup-simplify]: Simplify 0 into 0
11.182 * [backup-simplify]: Simplify 0 into 0
11.185 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.186 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
11.186 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
11.186 * [taylor]: Taking taylor expansion of +nan.0 in h
11.186 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.186 * [taylor]: Taking taylor expansion of (pow h 5) in h
11.186 * [taylor]: Taking taylor expansion of h in h
11.186 * [backup-simplify]: Simplify 0 into 0
11.186 * [backup-simplify]: Simplify 1 into 1
11.186 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.187 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
11.187 * [backup-simplify]: Simplify 0 into 0
11.189 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
11.189 * [backup-simplify]: Simplify 0 into 0
11.189 * [backup-simplify]: Simplify 0 into 0
11.192 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.193 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
11.193 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
11.193 * [taylor]: Taking taylor expansion of +nan.0 in h
11.193 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.193 * [taylor]: Taking taylor expansion of (pow h 6) in h
11.193 * [taylor]: Taking taylor expansion of h in h
11.193 * [backup-simplify]: Simplify 0 into 0
11.193 * [backup-simplify]: Simplify 1 into 1
11.193 * [backup-simplify]: Simplify (* 1 1) into 1
11.194 * [backup-simplify]: Simplify (* 1 1) into 1
11.194 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.194 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.195 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 h) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 h) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 h) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
11.196 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- h)))) into (sqrt (/ h d))
11.196 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
11.196 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
11.196 * [taylor]: Taking taylor expansion of (/ h d) in h
11.196 * [taylor]: Taking taylor expansion of h in h
11.196 * [backup-simplify]: Simplify 0 into 0
11.196 * [backup-simplify]: Simplify 1 into 1
11.196 * [taylor]: Taking taylor expansion of d in h
11.196 * [backup-simplify]: Simplify d into d
11.196 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
11.196 * [backup-simplify]: Simplify (sqrt 0) into 0
11.197 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
11.197 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
11.197 * [taylor]: Taking taylor expansion of (/ h d) in d
11.197 * [taylor]: Taking taylor expansion of h in d
11.197 * [backup-simplify]: Simplify h into h
11.197 * [taylor]: Taking taylor expansion of d in d
11.197 * [backup-simplify]: Simplify 0 into 0
11.197 * [backup-simplify]: Simplify 1 into 1
11.197 * [backup-simplify]: Simplify (/ h 1) into h
11.197 * [backup-simplify]: Simplify (sqrt 0) into 0
11.198 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.198 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
11.198 * [taylor]: Taking taylor expansion of (/ h d) in d
11.198 * [taylor]: Taking taylor expansion of h in d
11.198 * [backup-simplify]: Simplify h into h
11.198 * [taylor]: Taking taylor expansion of d in d
11.198 * [backup-simplify]: Simplify 0 into 0
11.198 * [backup-simplify]: Simplify 1 into 1
11.198 * [backup-simplify]: Simplify (/ h 1) into h
11.199 * [backup-simplify]: Simplify (sqrt 0) into 0
11.199 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.199 * [taylor]: Taking taylor expansion of 0 in h
11.199 * [backup-simplify]: Simplify 0 into 0
11.199 * [backup-simplify]: Simplify 0 into 0
11.199 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
11.199 * [taylor]: Taking taylor expansion of +nan.0 in h
11.199 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.200 * [taylor]: Taking taylor expansion of h in h
11.200 * [backup-simplify]: Simplify 0 into 0
11.200 * [backup-simplify]: Simplify 1 into 1
11.200 * [backup-simplify]: Simplify (* +nan.0 0) into 0
11.200 * [backup-simplify]: Simplify 0 into 0
11.200 * [backup-simplify]: Simplify 0 into 0
11.201 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
11.202 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
11.202 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
11.202 * [taylor]: Taking taylor expansion of +nan.0 in h
11.202 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.202 * [taylor]: Taking taylor expansion of (pow h 2) in h
11.202 * [taylor]: Taking taylor expansion of h in h
11.202 * [backup-simplify]: Simplify 0 into 0
11.202 * [backup-simplify]: Simplify 1 into 1
11.204 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
11.204 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.204 * [backup-simplify]: Simplify 0 into 0
11.206 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.207 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
11.207 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
11.207 * [taylor]: Taking taylor expansion of +nan.0 in h
11.207 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.207 * [taylor]: Taking taylor expansion of (pow h 3) in h
11.207 * [taylor]: Taking taylor expansion of h in h
11.207 * [backup-simplify]: Simplify 0 into 0
11.207 * [backup-simplify]: Simplify 1 into 1
11.208 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
11.208 * [backup-simplify]: Simplify 0 into 0
11.208 * [backup-simplify]: Simplify 0 into 0
11.210 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.211 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
11.211 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
11.211 * [taylor]: Taking taylor expansion of +nan.0 in h
11.211 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.211 * [taylor]: Taking taylor expansion of (pow h 4) in h
11.211 * [taylor]: Taking taylor expansion of h in h
11.211 * [backup-simplify]: Simplify 0 into 0
11.211 * [backup-simplify]: Simplify 1 into 1
11.211 * [backup-simplify]: Simplify (* 1 1) into 1
11.212 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.212 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.213 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
11.213 * [backup-simplify]: Simplify 0 into 0
11.213 * [backup-simplify]: Simplify 0 into 0
11.216 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.217 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
11.217 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
11.217 * [taylor]: Taking taylor expansion of +nan.0 in h
11.217 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.217 * [taylor]: Taking taylor expansion of (pow h 5) in h
11.217 * [taylor]: Taking taylor expansion of h in h
11.217 * [backup-simplify]: Simplify 0 into 0
11.217 * [backup-simplify]: Simplify 1 into 1
11.218 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.219 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
11.219 * [backup-simplify]: Simplify 0 into 0
11.220 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
11.220 * [backup-simplify]: Simplify 0 into 0
11.220 * [backup-simplify]: Simplify 0 into 0
11.223 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.229 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
11.229 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
11.229 * [taylor]: Taking taylor expansion of +nan.0 in h
11.229 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.229 * [taylor]: Taking taylor expansion of (pow h 6) in h
11.229 * [taylor]: Taking taylor expansion of h in h
11.229 * [backup-simplify]: Simplify 0 into 0
11.229 * [backup-simplify]: Simplify 1 into 1
11.230 * [backup-simplify]: Simplify (* 1 1) into 1
11.230 * [backup-simplify]: Simplify (* 1 1) into 1
11.231 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.231 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.232 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- h)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- h)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- h)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
11.232 * * * * [progress]: [ 4 / 4 ] generating series at (2 2 1)
11.233 * [backup-simplify]: Simplify (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) into (* 1/4 (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d)))
11.233 * [approximate]: Taking taylor expansion of (* 1/4 (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d))) in (d l h M D) around 0
11.233 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d))) in D
11.233 * [taylor]: Taking taylor expansion of 1/4 in D
11.233 * [backup-simplify]: Simplify 1/4 into 1/4
11.233 * [taylor]: Taking taylor expansion of (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d)) in D
11.233 * [taylor]: Taking taylor expansion of (sqrt (/ h l)) in D
11.233 * [taylor]: Taking taylor expansion of (/ h l) in D
11.233 * [taylor]: Taking taylor expansion of h in D
11.233 * [backup-simplify]: Simplify h into h
11.233 * [taylor]: Taking taylor expansion of l in D
11.233 * [backup-simplify]: Simplify l into l
11.233 * [backup-simplify]: Simplify (/ h l) into (/ h l)
11.233 * [backup-simplify]: Simplify (sqrt (/ h l)) into (sqrt (/ h l))
11.233 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ h l) (/ 0 l)))) into 0
11.233 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ h l)))) into 0
11.233 * [taylor]: Taking taylor expansion of (/ (* (pow M 2) (pow D 2)) d) in D
11.233 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in D
11.234 * [taylor]: Taking taylor expansion of (pow M 2) in D
11.234 * [taylor]: Taking taylor expansion of M in D
11.234 * [backup-simplify]: Simplify M into M
11.234 * [taylor]: Taking taylor expansion of (pow D 2) in D
11.234 * [taylor]: Taking taylor expansion of D in D
11.234 * [backup-simplify]: Simplify 0 into 0
11.234 * [backup-simplify]: Simplify 1 into 1
11.234 * [taylor]: Taking taylor expansion of d in D
11.234 * [backup-simplify]: Simplify d into d
11.234 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.234 * [backup-simplify]: Simplify (* 1 1) into 1
11.234 * [backup-simplify]: Simplify (* (pow M 2) 1) into (pow M 2)
11.234 * [backup-simplify]: Simplify (/ (pow M 2) d) into (/ (pow M 2) d)
11.235 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d))) in M
11.235 * [taylor]: Taking taylor expansion of 1/4 in M
11.235 * [backup-simplify]: Simplify 1/4 into 1/4
11.235 * [taylor]: Taking taylor expansion of (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d)) in M
11.235 * [taylor]: Taking taylor expansion of (sqrt (/ h l)) in M
11.235 * [taylor]: Taking taylor expansion of (/ h l) in M
11.235 * [taylor]: Taking taylor expansion of h in M
11.235 * [backup-simplify]: Simplify h into h
11.235 * [taylor]: Taking taylor expansion of l in M
11.235 * [backup-simplify]: Simplify l into l
11.235 * [backup-simplify]: Simplify (/ h l) into (/ h l)
11.235 * [backup-simplify]: Simplify (sqrt (/ h l)) into (sqrt (/ h l))
11.235 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ h l) (/ 0 l)))) into 0
11.235 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ h l)))) into 0
11.235 * [taylor]: Taking taylor expansion of (/ (* (pow M 2) (pow D 2)) d) in M
11.235 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
11.235 * [taylor]: Taking taylor expansion of (pow M 2) in M
11.235 * [taylor]: Taking taylor expansion of M in M
11.235 * [backup-simplify]: Simplify 0 into 0
11.235 * [backup-simplify]: Simplify 1 into 1
11.235 * [taylor]: Taking taylor expansion of (pow D 2) in M
11.235 * [taylor]: Taking taylor expansion of D in M
11.235 * [backup-simplify]: Simplify D into D
11.235 * [taylor]: Taking taylor expansion of d in M
11.235 * [backup-simplify]: Simplify d into d
11.236 * [backup-simplify]: Simplify (* 1 1) into 1
11.236 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.236 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
11.236 * [backup-simplify]: Simplify (/ (pow D 2) d) into (/ (pow D 2) d)
11.236 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d))) in h
11.236 * [taylor]: Taking taylor expansion of 1/4 in h
11.236 * [backup-simplify]: Simplify 1/4 into 1/4
11.236 * [taylor]: Taking taylor expansion of (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d)) in h
11.236 * [taylor]: Taking taylor expansion of (sqrt (/ h l)) in h
11.236 * [taylor]: Taking taylor expansion of (/ h l) in h
11.236 * [taylor]: Taking taylor expansion of h in h
11.236 * [backup-simplify]: Simplify 0 into 0
11.236 * [backup-simplify]: Simplify 1 into 1
11.236 * [taylor]: Taking taylor expansion of l in h
11.236 * [backup-simplify]: Simplify l into l
11.237 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
11.237 * [backup-simplify]: Simplify (sqrt 0) into 0
11.238 * [backup-simplify]: Simplify (/ (/ 1 l) (* 2 (sqrt 0))) into (/ +nan.0 l)
11.238 * [taylor]: Taking taylor expansion of (/ (* (pow M 2) (pow D 2)) d) in h
11.238 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in h
11.238 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.238 * [taylor]: Taking taylor expansion of M in h
11.238 * [backup-simplify]: Simplify M into M
11.238 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.238 * [taylor]: Taking taylor expansion of D in h
11.238 * [backup-simplify]: Simplify D into D
11.238 * [taylor]: Taking taylor expansion of d in h
11.238 * [backup-simplify]: Simplify d into d
11.238 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.238 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.238 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.238 * [backup-simplify]: Simplify (/ (* (pow M 2) (pow D 2)) d) into (/ (* (pow M 2) (pow D 2)) d)
11.238 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d))) in l
11.238 * [taylor]: Taking taylor expansion of 1/4 in l
11.238 * [backup-simplify]: Simplify 1/4 into 1/4
11.238 * [taylor]: Taking taylor expansion of (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d)) in l
11.238 * [taylor]: Taking taylor expansion of (sqrt (/ h l)) in l
11.238 * [taylor]: Taking taylor expansion of (/ h l) in l
11.238 * [taylor]: Taking taylor expansion of h in l
11.239 * [backup-simplify]: Simplify h into h
11.239 * [taylor]: Taking taylor expansion of l in l
11.239 * [backup-simplify]: Simplify 0 into 0
11.239 * [backup-simplify]: Simplify 1 into 1
11.239 * [backup-simplify]: Simplify (/ h 1) into h
11.239 * [backup-simplify]: Simplify (sqrt 0) into 0
11.240 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.240 * [taylor]: Taking taylor expansion of (/ (* (pow M 2) (pow D 2)) d) in l
11.240 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
11.240 * [taylor]: Taking taylor expansion of (pow M 2) in l
11.240 * [taylor]: Taking taylor expansion of M in l
11.240 * [backup-simplify]: Simplify M into M
11.240 * [taylor]: Taking taylor expansion of (pow D 2) in l
11.240 * [taylor]: Taking taylor expansion of D in l
11.240 * [backup-simplify]: Simplify D into D
11.240 * [taylor]: Taking taylor expansion of d in l
11.240 * [backup-simplify]: Simplify d into d
11.240 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.240 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.240 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.240 * [backup-simplify]: Simplify (/ (* (pow M 2) (pow D 2)) d) into (/ (* (pow M 2) (pow D 2)) d)
11.240 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d))) in d
11.240 * [taylor]: Taking taylor expansion of 1/4 in d
11.240 * [backup-simplify]: Simplify 1/4 into 1/4
11.241 * [taylor]: Taking taylor expansion of (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d)) in d
11.241 * [taylor]: Taking taylor expansion of (sqrt (/ h l)) in d
11.241 * [taylor]: Taking taylor expansion of (/ h l) in d
11.241 * [taylor]: Taking taylor expansion of h in d
11.241 * [backup-simplify]: Simplify h into h
11.241 * [taylor]: Taking taylor expansion of l in d
11.241 * [backup-simplify]: Simplify l into l
11.241 * [backup-simplify]: Simplify (/ h l) into (/ h l)
11.241 * [backup-simplify]: Simplify (sqrt (/ h l)) into (sqrt (/ h l))
11.241 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ h l) (/ 0 l)))) into 0
11.241 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ h l)))) into 0
11.241 * [taylor]: Taking taylor expansion of (/ (* (pow M 2) (pow D 2)) d) in d
11.241 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
11.241 * [taylor]: Taking taylor expansion of (pow M 2) in d
11.241 * [taylor]: Taking taylor expansion of M in d
11.241 * [backup-simplify]: Simplify M into M
11.241 * [taylor]: Taking taylor expansion of (pow D 2) in d
11.241 * [taylor]: Taking taylor expansion of D in d
11.241 * [backup-simplify]: Simplify D into D
11.241 * [taylor]: Taking taylor expansion of d in d
11.241 * [backup-simplify]: Simplify 0 into 0
11.241 * [backup-simplify]: Simplify 1 into 1
11.241 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.242 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.242 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.242 * [backup-simplify]: Simplify (/ (* (pow M 2) (pow D 2)) 1) into (* (pow M 2) (pow D 2))
11.242 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d))) in d
11.242 * [taylor]: Taking taylor expansion of 1/4 in d
11.242 * [backup-simplify]: Simplify 1/4 into 1/4
11.242 * [taylor]: Taking taylor expansion of (* (sqrt (/ h l)) (/ (* (pow M 2) (pow D 2)) d)) in d
11.242 * [taylor]: Taking taylor expansion of (sqrt (/ h l)) in d
11.242 * [taylor]: Taking taylor expansion of (/ h l) in d
11.242 * [taylor]: Taking taylor expansion of h in d
11.242 * [backup-simplify]: Simplify h into h
11.242 * [taylor]: Taking taylor expansion of l in d
11.242 * [backup-simplify]: Simplify l into l
11.242 * [backup-simplify]: Simplify (/ h l) into (/ h l)
11.242 * [backup-simplify]: Simplify (sqrt (/ h l)) into (sqrt (/ h l))
11.242 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ h l) (/ 0 l)))) into 0
11.243 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ h l)))) into 0
11.243 * [taylor]: Taking taylor expansion of (/ (* (pow M 2) (pow D 2)) d) in d
11.243 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
11.243 * [taylor]: Taking taylor expansion of (pow M 2) in d
11.243 * [taylor]: Taking taylor expansion of M in d
11.243 * [backup-simplify]: Simplify M into M
11.243 * [taylor]: Taking taylor expansion of (pow D 2) in d
11.243 * [taylor]: Taking taylor expansion of D in d
11.243 * [backup-simplify]: Simplify D into D
11.243 * [taylor]: Taking taylor expansion of d in d
11.243 * [backup-simplify]: Simplify 0 into 0
11.243 * [backup-simplify]: Simplify 1 into 1
11.243 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.243 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.243 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.243 * [backup-simplify]: Simplify (/ (* (pow M 2) (pow D 2)) 1) into (* (pow M 2) (pow D 2))
11.244 * [backup-simplify]: Simplify (* (sqrt (/ h l)) (* (pow M 2) (pow D 2))) into (* (sqrt (/ h l)) (* (pow M 2) (pow D 2)))
11.244 * [backup-simplify]: Simplify (* 1/4 (* (sqrt (/ h l)) (* (pow M 2) (pow D 2)))) into (* 1/4 (* (sqrt (/ h l)) (* (pow M 2) (pow D 2))))
11.244 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ h l)) (* (pow M 2) (pow D 2)))) in l
11.244 * [taylor]: Taking taylor expansion of 1/4 in l
11.244 * [backup-simplify]: Simplify 1/4 into 1/4
11.244 * [taylor]: Taking taylor expansion of (* (sqrt (/ h l)) (* (pow M 2) (pow D 2))) in l
11.244 * [taylor]: Taking taylor expansion of (sqrt (/ h l)) in l
11.244 * [taylor]: Taking taylor expansion of (/ h l) in l
11.244 * [taylor]: Taking taylor expansion of h in l
11.244 * [backup-simplify]: Simplify h into h
11.244 * [taylor]: Taking taylor expansion of l in l
11.244 * [backup-simplify]: Simplify 0 into 0
11.244 * [backup-simplify]: Simplify 1 into 1
11.244 * [backup-simplify]: Simplify (/ h 1) into h
11.245 * [backup-simplify]: Simplify (sqrt 0) into 0
11.246 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
11.246 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
11.246 * [taylor]: Taking taylor expansion of (pow M 2) in l
11.246 * [taylor]: Taking taylor expansion of M in l
11.246 * [backup-simplify]: Simplify M into M
11.246 * [taylor]: Taking taylor expansion of (pow D 2) in l
11.246 * [taylor]: Taking taylor expansion of D in l
11.246 * [backup-simplify]: Simplify D into D
11.246 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.246 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.246 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.247 * [backup-simplify]: Simplify (* 0 (* (pow M 2) (pow D 2))) into 0
11.247 * [backup-simplify]: Simplify (* 1/4 0) into 0
11.247 * [taylor]: Taking taylor expansion of 0 in h
11.247 * [backup-simplify]: Simplify 0 into 0
11.247 * [taylor]: Taking taylor expansion of 0 in M
11.247 * [backup-simplify]: Simplify 0 into 0
11.247 * [taylor]: Taking taylor expansion of 0 in D
11.247 * [backup-simplify]: Simplify 0 into 0
11.247 * [backup-simplify]: Simplify 0 into 0
11.247 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.248 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.248 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.249 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (* (pow M 2) (pow D 2)) (/ 0 1)))) into 0
11.249 * [backup-simplify]: Simplify (+ (* (sqrt (/ h l)) 0) (* 0 (* (pow M 2) (pow D 2)))) into 0
11.250 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (sqrt (/ h l)) (* (pow M 2) (pow D 2))))) into 0
11.250 * [taylor]: Taking taylor expansion of 0 in l
11.250 * [backup-simplify]: Simplify 0 into 0
11.250 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.250 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.250 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.251 * [backup-simplify]: Simplify (+ (* 0 0) (* (* +nan.0 h) (* (pow M 2) (pow D 2)))) into (- (* +nan.0 (* (pow M 2) (* (pow D 2) h))))
11.252 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (pow M 2) (* (pow D 2) h))))) (* 0 0)) into (- (* +nan.0 (* (pow M 2) (* (pow D 2) h))))
11.252 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (pow M 2) (* (pow D 2) h)))) in h
11.252 * [taylor]: Taking taylor expansion of (* +nan.0 (* (pow M 2) (* (pow D 2) h))) in h
11.252 * [taylor]: Taking taylor expansion of +nan.0 in h
11.252 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.252 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) h)) in h
11.252 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.252 * [taylor]: Taking taylor expansion of M in h
11.252 * [backup-simplify]: Simplify M into M
11.252 * [taylor]: Taking taylor expansion of (* (pow D 2) h) in h
11.252 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.252 * [taylor]: Taking taylor expansion of D in h
11.252 * [backup-simplify]: Simplify D into D
11.252 * [taylor]: Taking taylor expansion of h in h
11.252 * [backup-simplify]: Simplify 0 into 0
11.252 * [backup-simplify]: Simplify 1 into 1
11.252 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.252 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.252 * [backup-simplify]: Simplify (* (pow D 2) 0) into 0
11.252 * [backup-simplify]: Simplify (* (pow M 2) 0) into 0
11.253 * [backup-simplify]: Simplify (* +nan.0 0) into 0
11.253 * [backup-simplify]: Simplify (- 0) into 0
11.253 * [taylor]: Taking taylor expansion of 0 in M
11.253 * [backup-simplify]: Simplify 0 into 0
11.253 * [taylor]: Taking taylor expansion of 0 in D
11.253 * [backup-simplify]: Simplify 0 into 0
11.253 * [backup-simplify]: Simplify 0 into 0
11.254 * [taylor]: Taking taylor expansion of 0 in M
11.254 * [backup-simplify]: Simplify 0 into 0
11.254 * [taylor]: Taking taylor expansion of 0 in D
11.254 * [backup-simplify]: Simplify 0 into 0
11.254 * [backup-simplify]: Simplify 0 into 0
11.254 * [taylor]: Taking taylor expansion of 0 in D
11.254 * [backup-simplify]: Simplify 0 into 0
11.254 * [backup-simplify]: Simplify 0 into 0
11.254 * [backup-simplify]: Simplify 0 into 0
11.254 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.255 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.255 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.257 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (* (pow M 2) (pow D 2)) (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.257 * [backup-simplify]: Simplify (- (/ 0 l) (+ (* (/ h l) (/ 0 l)) (* 0 (/ 0 l)))) into 0
11.258 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ h l)))) into 0
11.259 * [backup-simplify]: Simplify (+ (* (sqrt (/ h l)) 0) (+ (* 0 0) (* 0 (* (pow M 2) (pow D 2))))) into 0
11.260 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (sqrt (/ h l)) (* (pow M 2) (pow D 2)))))) into 0
11.260 * [taylor]: Taking taylor expansion of 0 in l
11.260 * [backup-simplify]: Simplify 0 into 0
11.260 * [taylor]: Taking taylor expansion of 0 in h
11.260 * [backup-simplify]: Simplify 0 into 0
11.260 * [taylor]: Taking taylor expansion of 0 in M
11.260 * [backup-simplify]: Simplify 0 into 0
11.260 * [taylor]: Taking taylor expansion of 0 in D
11.260 * [backup-simplify]: Simplify 0 into 0
11.260 * [backup-simplify]: Simplify 0 into 0
11.260 * [backup-simplify]: Simplify 0 into 0
11.261 * [backup-simplify]: Simplify (* (* (sqrt (/ (/ 1 d) (/ 1 l))) (sqrt (/ (/ 1 d) (/ 1 h)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (/ 1 h)))) into (* 1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))))
11.261 * [approximate]: Taking taylor expansion of (* 1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in (d l h M D) around 0
11.261 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in D
11.261 * [taylor]: Taking taylor expansion of 1/4 in D
11.261 * [backup-simplify]: Simplify 1/4 into 1/4
11.261 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in D
11.261 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in D
11.261 * [taylor]: Taking taylor expansion of (/ l h) in D
11.261 * [taylor]: Taking taylor expansion of l in D
11.261 * [backup-simplify]: Simplify l into l
11.261 * [taylor]: Taking taylor expansion of h in D
11.261 * [backup-simplify]: Simplify h into h
11.261 * [backup-simplify]: Simplify (/ l h) into (/ l h)
11.261 * [backup-simplify]: Simplify (sqrt (/ l h)) into (sqrt (/ l h))
11.261 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)))) into 0
11.262 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ l h)))) into 0
11.262 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in D
11.262 * [taylor]: Taking taylor expansion of d in D
11.262 * [backup-simplify]: Simplify d into d
11.262 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in D
11.262 * [taylor]: Taking taylor expansion of (pow M 2) in D
11.262 * [taylor]: Taking taylor expansion of M in D
11.262 * [backup-simplify]: Simplify M into M
11.262 * [taylor]: Taking taylor expansion of (pow D 2) in D
11.262 * [taylor]: Taking taylor expansion of D in D
11.262 * [backup-simplify]: Simplify 0 into 0
11.262 * [backup-simplify]: Simplify 1 into 1
11.262 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.262 * [backup-simplify]: Simplify (* 1 1) into 1
11.262 * [backup-simplify]: Simplify (* (pow M 2) 1) into (pow M 2)
11.263 * [backup-simplify]: Simplify (/ d (pow M 2)) into (/ d (pow M 2))
11.263 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in M
11.263 * [taylor]: Taking taylor expansion of 1/4 in M
11.263 * [backup-simplify]: Simplify 1/4 into 1/4
11.263 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in M
11.263 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in M
11.263 * [taylor]: Taking taylor expansion of (/ l h) in M
11.263 * [taylor]: Taking taylor expansion of l in M
11.263 * [backup-simplify]: Simplify l into l
11.263 * [taylor]: Taking taylor expansion of h in M
11.263 * [backup-simplify]: Simplify h into h
11.263 * [backup-simplify]: Simplify (/ l h) into (/ l h)
11.263 * [backup-simplify]: Simplify (sqrt (/ l h)) into (sqrt (/ l h))
11.263 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)))) into 0
11.263 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ l h)))) into 0
11.263 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in M
11.263 * [taylor]: Taking taylor expansion of d in M
11.263 * [backup-simplify]: Simplify d into d
11.263 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
11.263 * [taylor]: Taking taylor expansion of (pow M 2) in M
11.263 * [taylor]: Taking taylor expansion of M in M
11.263 * [backup-simplify]: Simplify 0 into 0
11.263 * [backup-simplify]: Simplify 1 into 1
11.264 * [taylor]: Taking taylor expansion of (pow D 2) in M
11.264 * [taylor]: Taking taylor expansion of D in M
11.264 * [backup-simplify]: Simplify D into D
11.264 * [backup-simplify]: Simplify (* 1 1) into 1
11.264 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.265 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
11.265 * [backup-simplify]: Simplify (/ d (pow D 2)) into (/ d (pow D 2))
11.265 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in h
11.265 * [taylor]: Taking taylor expansion of 1/4 in h
11.265 * [backup-simplify]: Simplify 1/4 into 1/4
11.265 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in h
11.265 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in h
11.265 * [taylor]: Taking taylor expansion of (/ l h) in h
11.265 * [taylor]: Taking taylor expansion of l in h
11.265 * [backup-simplify]: Simplify l into l
11.265 * [taylor]: Taking taylor expansion of h in h
11.265 * [backup-simplify]: Simplify 0 into 0
11.265 * [backup-simplify]: Simplify 1 into 1
11.265 * [backup-simplify]: Simplify (/ l 1) into l
11.265 * [backup-simplify]: Simplify (sqrt 0) into 0
11.266 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
11.266 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in h
11.266 * [taylor]: Taking taylor expansion of d in h
11.266 * [backup-simplify]: Simplify d into d
11.266 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in h
11.266 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.266 * [taylor]: Taking taylor expansion of M in h
11.266 * [backup-simplify]: Simplify M into M
11.266 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.266 * [taylor]: Taking taylor expansion of D in h
11.266 * [backup-simplify]: Simplify D into D
11.266 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.267 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.267 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.267 * [backup-simplify]: Simplify (/ d (* (pow M 2) (pow D 2))) into (/ d (* (pow M 2) (pow D 2)))
11.267 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in l
11.267 * [taylor]: Taking taylor expansion of 1/4 in l
11.267 * [backup-simplify]: Simplify 1/4 into 1/4
11.267 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in l
11.267 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in l
11.267 * [taylor]: Taking taylor expansion of (/ l h) in l
11.267 * [taylor]: Taking taylor expansion of l in l
11.267 * [backup-simplify]: Simplify 0 into 0
11.267 * [backup-simplify]: Simplify 1 into 1
11.267 * [taylor]: Taking taylor expansion of h in l
11.267 * [backup-simplify]: Simplify h into h
11.267 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
11.268 * [backup-simplify]: Simplify (sqrt 0) into 0
11.268 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
11.268 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in l
11.268 * [taylor]: Taking taylor expansion of d in l
11.268 * [backup-simplify]: Simplify d into d
11.268 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
11.269 * [taylor]: Taking taylor expansion of (pow M 2) in l
11.269 * [taylor]: Taking taylor expansion of M in l
11.269 * [backup-simplify]: Simplify M into M
11.269 * [taylor]: Taking taylor expansion of (pow D 2) in l
11.269 * [taylor]: Taking taylor expansion of D in l
11.269 * [backup-simplify]: Simplify D into D
11.269 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.269 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.269 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.269 * [backup-simplify]: Simplify (/ d (* (pow M 2) (pow D 2))) into (/ d (* (pow M 2) (pow D 2)))
11.269 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in d
11.269 * [taylor]: Taking taylor expansion of 1/4 in d
11.269 * [backup-simplify]: Simplify 1/4 into 1/4
11.269 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in d
11.269 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in d
11.269 * [taylor]: Taking taylor expansion of (/ l h) in d
11.269 * [taylor]: Taking taylor expansion of l in d
11.269 * [backup-simplify]: Simplify l into l
11.269 * [taylor]: Taking taylor expansion of h in d
11.269 * [backup-simplify]: Simplify h into h
11.269 * [backup-simplify]: Simplify (/ l h) into (/ l h)
11.270 * [backup-simplify]: Simplify (sqrt (/ l h)) into (sqrt (/ l h))
11.270 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)))) into 0
11.270 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ l h)))) into 0
11.270 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in d
11.270 * [taylor]: Taking taylor expansion of d in d
11.270 * [backup-simplify]: Simplify 0 into 0
11.270 * [backup-simplify]: Simplify 1 into 1
11.270 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
11.270 * [taylor]: Taking taylor expansion of (pow M 2) in d
11.270 * [taylor]: Taking taylor expansion of M in d
11.270 * [backup-simplify]: Simplify M into M
11.270 * [taylor]: Taking taylor expansion of (pow D 2) in d
11.270 * [taylor]: Taking taylor expansion of D in d
11.270 * [backup-simplify]: Simplify D into D
11.270 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.270 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.270 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.271 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.271 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in d
11.271 * [taylor]: Taking taylor expansion of 1/4 in d
11.271 * [backup-simplify]: Simplify 1/4 into 1/4
11.271 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in d
11.271 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in d
11.271 * [taylor]: Taking taylor expansion of (/ l h) in d
11.271 * [taylor]: Taking taylor expansion of l in d
11.271 * [backup-simplify]: Simplify l into l
11.271 * [taylor]: Taking taylor expansion of h in d
11.271 * [backup-simplify]: Simplify h into h
11.271 * [backup-simplify]: Simplify (/ l h) into (/ l h)
11.271 * [backup-simplify]: Simplify (sqrt (/ l h)) into (sqrt (/ l h))
11.271 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)))) into 0
11.271 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ l h)))) into 0
11.271 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in d
11.271 * [taylor]: Taking taylor expansion of d in d
11.272 * [backup-simplify]: Simplify 0 into 0
11.272 * [backup-simplify]: Simplify 1 into 1
11.272 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
11.272 * [taylor]: Taking taylor expansion of (pow M 2) in d
11.272 * [taylor]: Taking taylor expansion of M in d
11.272 * [backup-simplify]: Simplify M into M
11.272 * [taylor]: Taking taylor expansion of (pow D 2) in d
11.272 * [taylor]: Taking taylor expansion of D in d
11.272 * [backup-simplify]: Simplify D into D
11.272 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.272 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.272 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.272 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.272 * [backup-simplify]: Simplify (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))) into (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))
11.273 * [backup-simplify]: Simplify (* 1/4 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))) into (* 1/4 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))))
11.273 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))) in l
11.273 * [taylor]: Taking taylor expansion of 1/4 in l
11.273 * [backup-simplify]: Simplify 1/4 into 1/4
11.273 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))) in l
11.273 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in l
11.273 * [taylor]: Taking taylor expansion of (/ l h) in l
11.273 * [taylor]: Taking taylor expansion of l in l
11.273 * [backup-simplify]: Simplify 0 into 0
11.273 * [backup-simplify]: Simplify 1 into 1
11.273 * [taylor]: Taking taylor expansion of h in l
11.273 * [backup-simplify]: Simplify h into h
11.273 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
11.274 * [backup-simplify]: Simplify (sqrt 0) into 0
11.274 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
11.274 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (pow D 2))) in l
11.274 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
11.274 * [taylor]: Taking taylor expansion of (pow M 2) in l
11.274 * [taylor]: Taking taylor expansion of M in l
11.275 * [backup-simplify]: Simplify M into M
11.275 * [taylor]: Taking taylor expansion of (pow D 2) in l
11.275 * [taylor]: Taking taylor expansion of D in l
11.275 * [backup-simplify]: Simplify D into D
11.275 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.275 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.275 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.275 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.275 * [backup-simplify]: Simplify (* 0 (/ 1 (* (pow M 2) (pow D 2)))) into 0
11.276 * [backup-simplify]: Simplify (* 1/4 0) into 0
11.276 * [taylor]: Taking taylor expansion of 0 in h
11.276 * [backup-simplify]: Simplify 0 into 0
11.276 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.276 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.276 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.276 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.277 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))) into 0
11.277 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.278 * [taylor]: Taking taylor expansion of 0 in l
11.278 * [backup-simplify]: Simplify 0 into 0
11.278 * [taylor]: Taking taylor expansion of 0 in h
11.278 * [backup-simplify]: Simplify 0 into 0
11.278 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.278 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.278 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.278 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.279 * [backup-simplify]: Simplify (+ (* 0 0) (* (/ +nan.0 h) (/ 1 (* (pow M 2) (pow D 2))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))
11.280 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0)) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))
11.280 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h))))) in h
11.280 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))) in h
11.280 * [taylor]: Taking taylor expansion of +nan.0 in h
11.280 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.280 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) h))) in h
11.280 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) h)) in h
11.280 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.280 * [taylor]: Taking taylor expansion of M in h
11.280 * [backup-simplify]: Simplify M into M
11.280 * [taylor]: Taking taylor expansion of (* (pow D 2) h) in h
11.280 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.280 * [taylor]: Taking taylor expansion of D in h
11.280 * [backup-simplify]: Simplify D into D
11.280 * [taylor]: Taking taylor expansion of h in h
11.280 * [backup-simplify]: Simplify 0 into 0
11.280 * [backup-simplify]: Simplify 1 into 1
11.280 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.280 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.280 * [backup-simplify]: Simplify (* (pow D 2) 0) into 0
11.280 * [backup-simplify]: Simplify (* (pow M 2) 0) into 0
11.281 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.281 * [backup-simplify]: Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
11.281 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.282 * [backup-simplify]: Simplify (+ (* (pow M 2) (pow D 2)) (* 0 0)) into (* (pow M 2) (pow D 2))
11.282 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.282 * [backup-simplify]: Simplify (* +nan.0 (/ 1 (* (pow M 2) (pow D 2)))) into (/ +nan.0 (* (pow M 2) (pow D 2)))
11.282 * [backup-simplify]: Simplify (- (/ +nan.0 (* (pow M 2) (pow D 2)))) into (- (* +nan.0 (/ 1 (* (pow M 2) (pow D 2)))))
11.282 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (pow D 2))))) in M
11.282 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (pow D 2)))) in M
11.282 * [taylor]: Taking taylor expansion of +nan.0 in M
11.282 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.282 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (pow D 2))) in M
11.282 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
11.282 * [taylor]: Taking taylor expansion of (pow M 2) in M
11.282 * [taylor]: Taking taylor expansion of M in M
11.282 * [backup-simplify]: Simplify 0 into 0
11.282 * [backup-simplify]: Simplify 1 into 1
11.283 * [taylor]: Taking taylor expansion of (pow D 2) in M
11.283 * [taylor]: Taking taylor expansion of D in M
11.283 * [backup-simplify]: Simplify D into D
11.283 * [backup-simplify]: Simplify (* 1 1) into 1
11.283 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.283 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
11.283 * [backup-simplify]: Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
11.283 * [backup-simplify]: Simplify (* +nan.0 (/ 1 (pow D 2))) into (/ +nan.0 (pow D 2))
11.283 * [backup-simplify]: Simplify (- (/ +nan.0 (pow D 2))) into (- (* +nan.0 (/ 1 (pow D 2))))
11.284 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (pow D 2)))) in D
11.284 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (pow D 2))) in D
11.284 * [taylor]: Taking taylor expansion of +nan.0 in D
11.284 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.284 * [taylor]: Taking taylor expansion of (/ 1 (pow D 2)) in D
11.284 * [taylor]: Taking taylor expansion of (pow D 2) in D
11.284 * [taylor]: Taking taylor expansion of D in D
11.284 * [backup-simplify]: Simplify 0 into 0
11.284 * [backup-simplify]: Simplify 1 into 1
11.284 * [backup-simplify]: Simplify (* 1 1) into 1
11.285 * [backup-simplify]: Simplify (/ 1 1) into 1
11.285 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.285 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.286 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.286 * [taylor]: Taking taylor expansion of 0 in M
11.286 * [backup-simplify]: Simplify 0 into 0
11.287 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.287 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.288 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.288 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.289 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.290 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ l h)))) into 0
11.290 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.291 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.291 * [taylor]: Taking taylor expansion of 0 in l
11.291 * [backup-simplify]: Simplify 0 into 0
11.291 * [taylor]: Taking taylor expansion of 0 in h
11.292 * [backup-simplify]: Simplify 0 into 0
11.292 * [taylor]: Taking taylor expansion of 0 in h
11.292 * [backup-simplify]: Simplify 0 into 0
11.292 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.293 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.293 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.294 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.294 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
11.295 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
11.295 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* (/ +nan.0 h) 0) (* (/ +nan.0 (pow h 2)) (/ 1 (* (pow M 2) (pow D 2)))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))
11.296 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))
11.297 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2)))))) in h
11.297 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))) in h
11.297 * [taylor]: Taking taylor expansion of +nan.0 in h
11.297 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.297 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2)))) in h
11.297 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (pow h 2))) in h
11.297 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.297 * [taylor]: Taking taylor expansion of M in h
11.297 * [backup-simplify]: Simplify M into M
11.297 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow h 2)) in h
11.297 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.297 * [taylor]: Taking taylor expansion of D in h
11.297 * [backup-simplify]: Simplify D into D
11.297 * [taylor]: Taking taylor expansion of (pow h 2) in h
11.297 * [taylor]: Taking taylor expansion of h in h
11.297 * [backup-simplify]: Simplify 0 into 0
11.297 * [backup-simplify]: Simplify 1 into 1
11.297 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.297 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.298 * [backup-simplify]: Simplify (* 1 1) into 1
11.298 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
11.298 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.298 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.299 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.299 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.299 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
11.299 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.299 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.300 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.300 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))) into 0
11.301 * [backup-simplify]: Simplify (- 0) into 0
11.301 * [taylor]: Taking taylor expansion of 0 in M
11.301 * [backup-simplify]: Simplify 0 into 0
11.301 * [taylor]: Taking taylor expansion of 0 in M
11.301 * [backup-simplify]: Simplify 0 into 0
11.301 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.302 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
11.303 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.303 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
11.303 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.304 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))) into 0
11.304 * [backup-simplify]: Simplify (- 0) into 0
11.304 * [taylor]: Taking taylor expansion of 0 in M
11.304 * [backup-simplify]: Simplify 0 into 0
11.305 * [taylor]: Taking taylor expansion of 0 in M
11.305 * [backup-simplify]: Simplify 0 into 0
11.305 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.305 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.306 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 (pow D 2))) into 0
11.306 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
11.307 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (/ 1 (pow D 2)))) into 0
11.307 * [backup-simplify]: Simplify (- 0) into 0
11.307 * [taylor]: Taking taylor expansion of 0 in D
11.307 * [backup-simplify]: Simplify 0 into 0
11.308 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.309 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
11.309 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
11.310 * [backup-simplify]: Simplify (- 0) into 0
11.310 * [backup-simplify]: Simplify 0 into 0
11.311 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.311 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.312 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.313 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.313 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.314 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ l h)))) into 0
11.315 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.317 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.317 * [taylor]: Taking taylor expansion of 0 in l
11.317 * [backup-simplify]: Simplify 0 into 0
11.317 * [taylor]: Taking taylor expansion of 0 in h
11.317 * [backup-simplify]: Simplify 0 into 0
11.317 * [taylor]: Taking taylor expansion of 0 in h
11.317 * [backup-simplify]: Simplify 0 into 0
11.317 * [taylor]: Taking taylor expansion of 0 in h
11.317 * [backup-simplify]: Simplify 0 into 0
11.318 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.319 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.320 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.320 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.320 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.321 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
11.322 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* (/ +nan.0 h) 0) (+ (* (/ +nan.0 (pow h 2)) 0) (* (/ +nan.0 (pow h 3)) (/ 1 (* (pow M 2) (pow D 2))))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))
11.323 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0)))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))
11.323 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3)))))) in h
11.323 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))) in h
11.323 * [taylor]: Taking taylor expansion of +nan.0 in h
11.324 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.324 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3)))) in h
11.324 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (pow h 3))) in h
11.324 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.324 * [taylor]: Taking taylor expansion of M in h
11.324 * [backup-simplify]: Simplify M into M
11.324 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow h 3)) in h
11.324 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.324 * [taylor]: Taking taylor expansion of D in h
11.324 * [backup-simplify]: Simplify D into D
11.324 * [taylor]: Taking taylor expansion of (pow h 3) in h
11.324 * [taylor]: Taking taylor expansion of h in h
11.324 * [backup-simplify]: Simplify 0 into 0
11.324 * [backup-simplify]: Simplify 1 into 1
11.324 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.324 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.324 * [backup-simplify]: Simplify (* 1 1) into 1
11.325 * [backup-simplify]: Simplify (* 1 1) into 1
11.325 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
11.325 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.325 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.325 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.326 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.326 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.326 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.327 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.327 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.327 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 1))) into 0
11.327 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.328 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
11.328 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.328 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.329 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.329 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.329 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.329 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.330 * [backup-simplify]: Simplify (- 0) into 0
11.330 * [taylor]: Taking taylor expansion of 0 in M
11.330 * [backup-simplify]: Simplify 0 into 0
11.330 * [taylor]: Taking taylor expansion of 0 in M
11.330 * [backup-simplify]: Simplify 0 into 0
11.330 * [taylor]: Taking taylor expansion of 0 in M
11.330 * [backup-simplify]: Simplify 0 into 0
11.330 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.331 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.331 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 1))) into 0
11.331 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.332 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.332 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.333 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.333 * [backup-simplify]: Simplify (- 0) into 0
11.333 * [taylor]: Taking taylor expansion of 0 in M
11.333 * [backup-simplify]: Simplify 0 into 0
11.333 * [taylor]: Taking taylor expansion of 0 in M
11.333 * [backup-simplify]: Simplify 0 into 0
11.333 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.334 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
11.334 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.335 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
11.335 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.336 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.336 * [backup-simplify]: Simplify (- 0) into 0
11.336 * [taylor]: Taking taylor expansion of 0 in M
11.336 * [backup-simplify]: Simplify 0 into 0
11.336 * [taylor]: Taking taylor expansion of 0 in M
11.336 * [backup-simplify]: Simplify 0 into 0
11.337 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.337 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.338 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.338 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
11.338 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2))))) into 0
11.339 * [backup-simplify]: Simplify (- 0) into 0
11.339 * [taylor]: Taking taylor expansion of 0 in D
11.339 * [backup-simplify]: Simplify 0 into 0
11.339 * [taylor]: Taking taylor expansion of 0 in D
11.339 * [backup-simplify]: Simplify 0 into 0
11.339 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.340 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.340 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 1))) into 0
11.340 * [backup-simplify]: Simplify (- 0) into 0
11.341 * [backup-simplify]: Simplify 0 into 0
11.341 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.342 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.343 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.343 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.343 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.344 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ l h)))) into 0
11.345 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.346 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))))))) into 0
11.346 * [taylor]: Taking taylor expansion of 0 in l
11.346 * [backup-simplify]: Simplify 0 into 0
11.346 * [taylor]: Taking taylor expansion of 0 in h
11.346 * [backup-simplify]: Simplify 0 into 0
11.346 * [taylor]: Taking taylor expansion of 0 in h
11.346 * [backup-simplify]: Simplify 0 into 0
11.346 * [taylor]: Taking taylor expansion of 0 in h
11.346 * [backup-simplify]: Simplify 0 into 0
11.346 * [taylor]: Taking taylor expansion of 0 in h
11.346 * [backup-simplify]: Simplify 0 into 0
11.347 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.348 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.348 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.349 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.349 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.349 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 (pow h 2)) 2) (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 3)))))) (* 2 0)) into (/ +nan.0 (pow h 4))
11.350 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* (/ +nan.0 h) 0) (+ (* (/ +nan.0 (pow h 2)) 0) (+ (* (/ +nan.0 (pow h 3)) 0) (* (/ +nan.0 (pow h 4)) (/ 1 (* (pow M 2) (pow D 2)))))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))))
11.351 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))))
11.351 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4)))))) in h
11.351 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))) in h
11.351 * [taylor]: Taking taylor expansion of +nan.0 in h
11.351 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.351 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4)))) in h
11.351 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (pow h 4))) in h
11.351 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.351 * [taylor]: Taking taylor expansion of M in h
11.351 * [backup-simplify]: Simplify M into M
11.351 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow h 4)) in h
11.351 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.351 * [taylor]: Taking taylor expansion of D in h
11.351 * [backup-simplify]: Simplify D into D
11.351 * [taylor]: Taking taylor expansion of (pow h 4) in h
11.351 * [taylor]: Taking taylor expansion of h in h
11.351 * [backup-simplify]: Simplify 0 into 0
11.351 * [backup-simplify]: Simplify 1 into 1
11.351 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.351 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.351 * [backup-simplify]: Simplify (* 1 1) into 1
11.352 * [backup-simplify]: Simplify (* 1 1) into 1
11.352 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
11.352 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.352 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.353 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.354 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.355 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.356 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.356 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.357 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.358 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.358 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.359 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.360 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.360 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.361 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 1))) into 0
11.361 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.362 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
11.368 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.369 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.370 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.370 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.371 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.371 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.372 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.373 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.374 * [backup-simplify]: Simplify (- 0) into 0
11.374 * [taylor]: Taking taylor expansion of 0 in M
11.374 * [backup-simplify]: Simplify 0 into 0
11.374 * [taylor]: Taking taylor expansion of 0 in M
11.374 * [backup-simplify]: Simplify 0 into 0
11.374 * [taylor]: Taking taylor expansion of 0 in M
11.374 * [backup-simplify]: Simplify 0 into 0
11.374 * [taylor]: Taking taylor expansion of 0 in M
11.374 * [backup-simplify]: Simplify 0 into 0
11.375 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.376 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.377 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.378 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.379 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.380 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.381 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.382 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.382 * [backup-simplify]: Simplify (- 0) into 0
11.382 * [taylor]: Taking taylor expansion of 0 in M
11.383 * [backup-simplify]: Simplify 0 into 0
11.383 * [taylor]: Taking taylor expansion of 0 in M
11.383 * [backup-simplify]: Simplify 0 into 0
11.383 * [taylor]: Taking taylor expansion of 0 in M
11.383 * [backup-simplify]: Simplify 0 into 0
11.384 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.385 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.386 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.386 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.387 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.388 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.390 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.390 * [backup-simplify]: Simplify (- 0) into 0
11.390 * [taylor]: Taking taylor expansion of 0 in M
11.390 * [backup-simplify]: Simplify 0 into 0
11.390 * [taylor]: Taking taylor expansion of 0 in M
11.390 * [backup-simplify]: Simplify 0 into 0
11.391 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.393 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
11.394 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.395 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
11.396 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.396 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.397 * [backup-simplify]: Simplify (- 0) into 0
11.397 * [taylor]: Taking taylor expansion of 0 in M
11.397 * [backup-simplify]: Simplify 0 into 0
11.397 * [taylor]: Taking taylor expansion of 0 in M
11.397 * [backup-simplify]: Simplify 0 into 0
11.397 * [taylor]: Taking taylor expansion of 0 in D
11.397 * [backup-simplify]: Simplify 0 into 0
11.397 * [taylor]: Taking taylor expansion of 0 in D
11.397 * [backup-simplify]: Simplify 0 into 0
11.397 * [taylor]: Taking taylor expansion of 0 in D
11.397 * [backup-simplify]: Simplify 0 into 0
11.397 * [taylor]: Taking taylor expansion of 0 in D
11.397 * [backup-simplify]: Simplify 0 into 0
11.398 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.398 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.399 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.399 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
11.400 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2)))))) into 0
11.400 * [backup-simplify]: Simplify (- 0) into 0
11.400 * [taylor]: Taking taylor expansion of 0 in D
11.400 * [backup-simplify]: Simplify 0 into 0
11.400 * [taylor]: Taking taylor expansion of 0 in D
11.400 * [backup-simplify]: Simplify 0 into 0
11.400 * [backup-simplify]: Simplify 0 into 0
11.401 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.402 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.402 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.402 * [backup-simplify]: Simplify (- 0) into 0
11.402 * [backup-simplify]: Simplify 0 into 0
11.403 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
11.404 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))))) into 0
11.405 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
11.406 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.406 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.407 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)) (* 2 (* 0 0)))) (* 2 (sqrt (/ l h)))) into 0
11.408 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))))) into 0
11.409 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))))))))) into 0
11.409 * [taylor]: Taking taylor expansion of 0 in l
11.409 * [backup-simplify]: Simplify 0 into 0
11.409 * [taylor]: Taking taylor expansion of 0 in h
11.409 * [backup-simplify]: Simplify 0 into 0
11.409 * [taylor]: Taking taylor expansion of 0 in h
11.409 * [backup-simplify]: Simplify 0 into 0
11.409 * [taylor]: Taking taylor expansion of 0 in h
11.409 * [backup-simplify]: Simplify 0 into 0
11.409 * [taylor]: Taking taylor expansion of 0 in h
11.409 * [backup-simplify]: Simplify 0 into 0
11.409 * [taylor]: Taking taylor expansion of 0 in h
11.409 * [backup-simplify]: Simplify 0 into 0
11.410 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
11.411 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))))) into 0
11.412 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
11.412 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.413 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.413 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 4)))) (* 2 (* (/ +nan.0 (pow h 2)) (/ +nan.0 (pow h 3)))))) (* 2 0)) into (/ +nan.0 (pow h 5))
11.414 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* (/ +nan.0 h) 0) (+ (* (/ +nan.0 (pow h 2)) 0) (+ (* (/ +nan.0 (pow h 3)) 0) (+ (* (/ +nan.0 (pow h 4)) 0) (* (/ +nan.0 (pow h 5)) (/ 1 (* (pow M 2) (pow D 2))))))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5))))))
11.415 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0)))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5))))))
11.415 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5)))))) in h
11.415 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5))))) in h
11.415 * [taylor]: Taking taylor expansion of +nan.0 in h
11.415 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.415 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5)))) in h
11.415 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (pow h 5))) in h
11.415 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.415 * [taylor]: Taking taylor expansion of M in h
11.415 * [backup-simplify]: Simplify M into M
11.415 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow h 5)) in h
11.415 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.415 * [taylor]: Taking taylor expansion of D in h
11.415 * [backup-simplify]: Simplify D into D
11.415 * [taylor]: Taking taylor expansion of (pow h 5) in h
11.415 * [taylor]: Taking taylor expansion of h in h
11.415 * [backup-simplify]: Simplify 0 into 0
11.415 * [backup-simplify]: Simplify 1 into 1
11.415 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.415 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.415 * [backup-simplify]: Simplify (* 1 1) into 1
11.416 * [backup-simplify]: Simplify (* 1 1) into 1
11.416 * [backup-simplify]: Simplify (* 1 1) into 1
11.416 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
11.416 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.416 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.417 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.417 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.418 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.418 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.419 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.420 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.420 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.421 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.421 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.421 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.422 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.422 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.423 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.423 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.424 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.424 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.425 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.425 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.425 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.426 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.426 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 1))) into 0
11.427 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.427 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
11.428 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.429 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.429 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.429 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.430 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.431 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.431 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.432 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.433 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.434 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.435 * [backup-simplify]: Simplify (- 0) into 0
11.435 * [taylor]: Taking taylor expansion of 0 in M
11.435 * [backup-simplify]: Simplify 0 into 0
11.435 * [taylor]: Taking taylor expansion of 0 in M
11.435 * [backup-simplify]: Simplify 0 into 0
11.435 * [taylor]: Taking taylor expansion of 0 in M
11.435 * [backup-simplify]: Simplify 0 into 0
11.435 * [taylor]: Taking taylor expansion of 0 in M
11.435 * [backup-simplify]: Simplify 0 into 0
11.435 * [taylor]: Taking taylor expansion of 0 in M
11.435 * [backup-simplify]: Simplify 0 into 0
11.437 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.438 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.439 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.440 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.442 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.443 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.444 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.445 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.446 * [backup-simplify]: Simplify (- 0) into 0
11.446 * [taylor]: Taking taylor expansion of 0 in M
11.446 * [backup-simplify]: Simplify 0 into 0
11.446 * [taylor]: Taking taylor expansion of 0 in M
11.446 * [backup-simplify]: Simplify 0 into 0
11.446 * [taylor]: Taking taylor expansion of 0 in M
11.446 * [backup-simplify]: Simplify 0 into 0
11.446 * [taylor]: Taking taylor expansion of 0 in M
11.446 * [backup-simplify]: Simplify 0 into 0
11.447 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.448 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.450 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.451 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.452 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.453 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.454 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.455 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.456 * [backup-simplify]: Simplify (- 0) into 0
11.456 * [taylor]: Taking taylor expansion of 0 in M
11.456 * [backup-simplify]: Simplify 0 into 0
11.456 * [taylor]: Taking taylor expansion of 0 in M
11.456 * [backup-simplify]: Simplify 0 into 0
11.456 * [taylor]: Taking taylor expansion of 0 in M
11.456 * [backup-simplify]: Simplify 0 into 0
11.457 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.458 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.459 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.461 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.462 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.462 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.464 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.465 * [backup-simplify]: Simplify (- 0) into 0
11.465 * [taylor]: Taking taylor expansion of 0 in M
11.465 * [backup-simplify]: Simplify 0 into 0
11.465 * [taylor]: Taking taylor expansion of 0 in M
11.465 * [backup-simplify]: Simplify 0 into 0
11.466 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
11.467 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
11.469 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))))) into 0
11.470 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
11.471 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.472 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.473 * [backup-simplify]: Simplify (- 0) into 0
11.473 * [taylor]: Taking taylor expansion of 0 in M
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in M
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.473 * [taylor]: Taking taylor expansion of 0 in D
11.473 * [backup-simplify]: Simplify 0 into 0
11.474 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.475 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.476 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.476 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
11.477 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2))))))) into 0
11.477 * [backup-simplify]: Simplify (- 0) into 0
11.477 * [taylor]: Taking taylor expansion of 0 in D
11.477 * [backup-simplify]: Simplify 0 into 0
11.477 * [taylor]: Taking taylor expansion of 0 in D
11.477 * [backup-simplify]: Simplify 0 into 0
11.478 * [backup-simplify]: Simplify 0 into 0
11.478 * [backup-simplify]: Simplify 0 into 0
11.478 * [backup-simplify]: Simplify (* (- +nan.0) (* (pow (/ 1 D) -2) (* (pow (/ 1 M) -2) (* (/ 1 (/ 1 h)) (* (/ 1 l) (/ 1 d)))))) into (* +nan.0 (/ (* (pow M 2) (* (pow D 2) h)) (* l d)))
11.479 * [backup-simplify]: Simplify (* (* (sqrt (/ (/ 1 (- d)) (/ 1 (- l)))) (sqrt (/ (/ 1 (- d)) (/ 1 (- h))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (/ 1 (- h))))) into (* -1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))))
11.479 * [approximate]: Taking taylor expansion of (* -1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in (d l h M D) around 0
11.479 * [taylor]: Taking taylor expansion of (* -1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in D
11.479 * [taylor]: Taking taylor expansion of -1/4 in D
11.479 * [backup-simplify]: Simplify -1/4 into -1/4
11.479 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in D
11.479 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in D
11.479 * [taylor]: Taking taylor expansion of (/ l h) in D
11.479 * [taylor]: Taking taylor expansion of l in D
11.479 * [backup-simplify]: Simplify l into l
11.479 * [taylor]: Taking taylor expansion of h in D
11.479 * [backup-simplify]: Simplify h into h
11.479 * [backup-simplify]: Simplify (/ l h) into (/ l h)
11.479 * [backup-simplify]: Simplify (sqrt (/ l h)) into (sqrt (/ l h))
11.479 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)))) into 0
11.479 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ l h)))) into 0
11.479 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in D
11.479 * [taylor]: Taking taylor expansion of d in D
11.479 * [backup-simplify]: Simplify d into d
11.479 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in D
11.479 * [taylor]: Taking taylor expansion of (pow M 2) in D
11.479 * [taylor]: Taking taylor expansion of M in D
11.479 * [backup-simplify]: Simplify M into M
11.479 * [taylor]: Taking taylor expansion of (pow D 2) in D
11.479 * [taylor]: Taking taylor expansion of D in D
11.479 * [backup-simplify]: Simplify 0 into 0
11.479 * [backup-simplify]: Simplify 1 into 1
11.480 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.480 * [backup-simplify]: Simplify (* 1 1) into 1
11.480 * [backup-simplify]: Simplify (* (pow M 2) 1) into (pow M 2)
11.480 * [backup-simplify]: Simplify (/ d (pow M 2)) into (/ d (pow M 2))
11.480 * [taylor]: Taking taylor expansion of (* -1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in M
11.480 * [taylor]: Taking taylor expansion of -1/4 in M
11.480 * [backup-simplify]: Simplify -1/4 into -1/4
11.480 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in M
11.480 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in M
11.480 * [taylor]: Taking taylor expansion of (/ l h) in M
11.480 * [taylor]: Taking taylor expansion of l in M
11.480 * [backup-simplify]: Simplify l into l
11.480 * [taylor]: Taking taylor expansion of h in M
11.480 * [backup-simplify]: Simplify h into h
11.480 * [backup-simplify]: Simplify (/ l h) into (/ l h)
11.480 * [backup-simplify]: Simplify (sqrt (/ l h)) into (sqrt (/ l h))
11.480 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)))) into 0
11.480 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ l h)))) into 0
11.480 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in M
11.481 * [taylor]: Taking taylor expansion of d in M
11.481 * [backup-simplify]: Simplify d into d
11.481 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
11.481 * [taylor]: Taking taylor expansion of (pow M 2) in M
11.481 * [taylor]: Taking taylor expansion of M in M
11.481 * [backup-simplify]: Simplify 0 into 0
11.481 * [backup-simplify]: Simplify 1 into 1
11.481 * [taylor]: Taking taylor expansion of (pow D 2) in M
11.481 * [taylor]: Taking taylor expansion of D in M
11.481 * [backup-simplify]: Simplify D into D
11.484 * [backup-simplify]: Simplify (* 1 1) into 1
11.484 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.484 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
11.484 * [backup-simplify]: Simplify (/ d (pow D 2)) into (/ d (pow D 2))
11.484 * [taylor]: Taking taylor expansion of (* -1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in h
11.484 * [taylor]: Taking taylor expansion of -1/4 in h
11.484 * [backup-simplify]: Simplify -1/4 into -1/4
11.484 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in h
11.484 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in h
11.484 * [taylor]: Taking taylor expansion of (/ l h) in h
11.484 * [taylor]: Taking taylor expansion of l in h
11.485 * [backup-simplify]: Simplify l into l
11.485 * [taylor]: Taking taylor expansion of h in h
11.485 * [backup-simplify]: Simplify 0 into 0
11.485 * [backup-simplify]: Simplify 1 into 1
11.485 * [backup-simplify]: Simplify (/ l 1) into l
11.485 * [backup-simplify]: Simplify (sqrt 0) into 0
11.486 * [backup-simplify]: Simplify (/ l (* 2 (sqrt 0))) into (* +nan.0 l)
11.486 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in h
11.486 * [taylor]: Taking taylor expansion of d in h
11.486 * [backup-simplify]: Simplify d into d
11.486 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in h
11.486 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.486 * [taylor]: Taking taylor expansion of M in h
11.486 * [backup-simplify]: Simplify M into M
11.486 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.486 * [taylor]: Taking taylor expansion of D in h
11.486 * [backup-simplify]: Simplify D into D
11.486 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.486 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.486 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.486 * [backup-simplify]: Simplify (/ d (* (pow M 2) (pow D 2))) into (/ d (* (pow M 2) (pow D 2)))
11.486 * [taylor]: Taking taylor expansion of (* -1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in l
11.486 * [taylor]: Taking taylor expansion of -1/4 in l
11.486 * [backup-simplify]: Simplify -1/4 into -1/4
11.486 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in l
11.486 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in l
11.486 * [taylor]: Taking taylor expansion of (/ l h) in l
11.486 * [taylor]: Taking taylor expansion of l in l
11.486 * [backup-simplify]: Simplify 0 into 0
11.486 * [backup-simplify]: Simplify 1 into 1
11.486 * [taylor]: Taking taylor expansion of h in l
11.486 * [backup-simplify]: Simplify h into h
11.486 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
11.487 * [backup-simplify]: Simplify (sqrt 0) into 0
11.487 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
11.487 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in l
11.487 * [taylor]: Taking taylor expansion of d in l
11.487 * [backup-simplify]: Simplify d into d
11.487 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
11.487 * [taylor]: Taking taylor expansion of (pow M 2) in l
11.487 * [taylor]: Taking taylor expansion of M in l
11.487 * [backup-simplify]: Simplify M into M
11.487 * [taylor]: Taking taylor expansion of (pow D 2) in l
11.487 * [taylor]: Taking taylor expansion of D in l
11.487 * [backup-simplify]: Simplify D into D
11.487 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.487 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.487 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.487 * [backup-simplify]: Simplify (/ d (* (pow M 2) (pow D 2))) into (/ d (* (pow M 2) (pow D 2)))
11.487 * [taylor]: Taking taylor expansion of (* -1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in d
11.487 * [taylor]: Taking taylor expansion of -1/4 in d
11.487 * [backup-simplify]: Simplify -1/4 into -1/4
11.487 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in d
11.487 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in d
11.487 * [taylor]: Taking taylor expansion of (/ l h) in d
11.487 * [taylor]: Taking taylor expansion of l in d
11.488 * [backup-simplify]: Simplify l into l
11.488 * [taylor]: Taking taylor expansion of h in d
11.488 * [backup-simplify]: Simplify h into h
11.488 * [backup-simplify]: Simplify (/ l h) into (/ l h)
11.488 * [backup-simplify]: Simplify (sqrt (/ l h)) into (sqrt (/ l h))
11.488 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)))) into 0
11.488 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ l h)))) into 0
11.488 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in d
11.488 * [taylor]: Taking taylor expansion of d in d
11.488 * [backup-simplify]: Simplify 0 into 0
11.488 * [backup-simplify]: Simplify 1 into 1
11.488 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
11.488 * [taylor]: Taking taylor expansion of (pow M 2) in d
11.488 * [taylor]: Taking taylor expansion of M in d
11.488 * [backup-simplify]: Simplify M into M
11.488 * [taylor]: Taking taylor expansion of (pow D 2) in d
11.488 * [taylor]: Taking taylor expansion of D in d
11.488 * [backup-simplify]: Simplify D into D
11.488 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.488 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.488 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.488 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.488 * [taylor]: Taking taylor expansion of (* -1/4 (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2))))) in d
11.488 * [taylor]: Taking taylor expansion of -1/4 in d
11.488 * [backup-simplify]: Simplify -1/4 into -1/4
11.488 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ d (* (pow M 2) (pow D 2)))) in d
11.488 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in d
11.488 * [taylor]: Taking taylor expansion of (/ l h) in d
11.488 * [taylor]: Taking taylor expansion of l in d
11.488 * [backup-simplify]: Simplify l into l
11.488 * [taylor]: Taking taylor expansion of h in d
11.488 * [backup-simplify]: Simplify h into h
11.488 * [backup-simplify]: Simplify (/ l h) into (/ l h)
11.488 * [backup-simplify]: Simplify (sqrt (/ l h)) into (sqrt (/ l h))
11.489 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)))) into 0
11.489 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ l h)))) into 0
11.489 * [taylor]: Taking taylor expansion of (/ d (* (pow M 2) (pow D 2))) in d
11.489 * [taylor]: Taking taylor expansion of d in d
11.489 * [backup-simplify]: Simplify 0 into 0
11.489 * [backup-simplify]: Simplify 1 into 1
11.489 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
11.489 * [taylor]: Taking taylor expansion of (pow M 2) in d
11.489 * [taylor]: Taking taylor expansion of M in d
11.489 * [backup-simplify]: Simplify M into M
11.489 * [taylor]: Taking taylor expansion of (pow D 2) in d
11.489 * [taylor]: Taking taylor expansion of D in d
11.489 * [backup-simplify]: Simplify D into D
11.489 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.489 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.489 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.489 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.489 * [backup-simplify]: Simplify (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))) into (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))
11.490 * [backup-simplify]: Simplify (* -1/4 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))) into (* -1/4 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))))
11.490 * [taylor]: Taking taylor expansion of (* -1/4 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))) in l
11.490 * [taylor]: Taking taylor expansion of -1/4 in l
11.490 * [backup-simplify]: Simplify -1/4 into -1/4
11.490 * [taylor]: Taking taylor expansion of (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))) in l
11.490 * [taylor]: Taking taylor expansion of (sqrt (/ l h)) in l
11.490 * [taylor]: Taking taylor expansion of (/ l h) in l
11.490 * [taylor]: Taking taylor expansion of l in l
11.490 * [backup-simplify]: Simplify 0 into 0
11.490 * [backup-simplify]: Simplify 1 into 1
11.490 * [taylor]: Taking taylor expansion of h in l
11.490 * [backup-simplify]: Simplify h into h
11.490 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
11.490 * [backup-simplify]: Simplify (sqrt 0) into 0
11.491 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
11.491 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (pow D 2))) in l
11.491 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
11.491 * [taylor]: Taking taylor expansion of (pow M 2) in l
11.491 * [taylor]: Taking taylor expansion of M in l
11.491 * [backup-simplify]: Simplify M into M
11.491 * [taylor]: Taking taylor expansion of (pow D 2) in l
11.491 * [taylor]: Taking taylor expansion of D in l
11.491 * [backup-simplify]: Simplify D into D
11.491 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.491 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.491 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.491 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.491 * [backup-simplify]: Simplify (* 0 (/ 1 (* (pow M 2) (pow D 2)))) into 0
11.491 * [backup-simplify]: Simplify (* -1/4 0) into 0
11.491 * [taylor]: Taking taylor expansion of 0 in h
11.491 * [backup-simplify]: Simplify 0 into 0
11.491 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.491 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.492 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.492 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.492 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))) into 0
11.492 * [backup-simplify]: Simplify (+ (* -1/4 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.492 * [taylor]: Taking taylor expansion of 0 in l
11.492 * [backup-simplify]: Simplify 0 into 0
11.492 * [taylor]: Taking taylor expansion of 0 in h
11.492 * [backup-simplify]: Simplify 0 into 0
11.492 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.493 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.493 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.493 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.493 * [backup-simplify]: Simplify (+ (* 0 0) (* (/ +nan.0 h) (/ 1 (* (pow M 2) (pow D 2))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))
11.494 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0)) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))
11.494 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h))))) in h
11.494 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))) in h
11.494 * [taylor]: Taking taylor expansion of +nan.0 in h
11.494 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.494 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) h))) in h
11.494 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) h)) in h
11.494 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.494 * [taylor]: Taking taylor expansion of M in h
11.494 * [backup-simplify]: Simplify M into M
11.494 * [taylor]: Taking taylor expansion of (* (pow D 2) h) in h
11.494 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.494 * [taylor]: Taking taylor expansion of D in h
11.494 * [backup-simplify]: Simplify D into D
11.494 * [taylor]: Taking taylor expansion of h in h
11.494 * [backup-simplify]: Simplify 0 into 0
11.494 * [backup-simplify]: Simplify 1 into 1
11.494 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.494 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.494 * [backup-simplify]: Simplify (* (pow D 2) 0) into 0
11.494 * [backup-simplify]: Simplify (* (pow M 2) 0) into 0
11.494 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.494 * [backup-simplify]: Simplify (+ (* (pow D 2) 1) (* 0 0)) into (pow D 2)
11.494 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.495 * [backup-simplify]: Simplify (+ (* (pow M 2) (pow D 2)) (* 0 0)) into (* (pow M 2) (pow D 2))
11.495 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.495 * [backup-simplify]: Simplify (* +nan.0 (/ 1 (* (pow M 2) (pow D 2)))) into (/ +nan.0 (* (pow M 2) (pow D 2)))
11.495 * [backup-simplify]: Simplify (- (/ +nan.0 (* (pow M 2) (pow D 2)))) into (- (* +nan.0 (/ 1 (* (pow M 2) (pow D 2)))))
11.495 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (pow D 2))))) in M
11.495 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (pow D 2)))) in M
11.495 * [taylor]: Taking taylor expansion of +nan.0 in M
11.495 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.495 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (pow D 2))) in M
11.495 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
11.495 * [taylor]: Taking taylor expansion of (pow M 2) in M
11.495 * [taylor]: Taking taylor expansion of M in M
11.495 * [backup-simplify]: Simplify 0 into 0
11.495 * [backup-simplify]: Simplify 1 into 1
11.495 * [taylor]: Taking taylor expansion of (pow D 2) in M
11.495 * [taylor]: Taking taylor expansion of D in M
11.495 * [backup-simplify]: Simplify D into D
11.496 * [backup-simplify]: Simplify (* 1 1) into 1
11.496 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.496 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
11.496 * [backup-simplify]: Simplify (/ 1 (pow D 2)) into (/ 1 (pow D 2))
11.496 * [backup-simplify]: Simplify (* +nan.0 (/ 1 (pow D 2))) into (/ +nan.0 (pow D 2))
11.496 * [backup-simplify]: Simplify (- (/ +nan.0 (pow D 2))) into (- (* +nan.0 (/ 1 (pow D 2))))
11.496 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (pow D 2)))) in D
11.496 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (pow D 2))) in D
11.496 * [taylor]: Taking taylor expansion of +nan.0 in D
11.496 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.496 * [taylor]: Taking taylor expansion of (/ 1 (pow D 2)) in D
11.496 * [taylor]: Taking taylor expansion of (pow D 2) in D
11.496 * [taylor]: Taking taylor expansion of D in D
11.496 * [backup-simplify]: Simplify 0 into 0
11.496 * [backup-simplify]: Simplify 1 into 1
11.496 * [backup-simplify]: Simplify (* 1 1) into 1
11.496 * [backup-simplify]: Simplify (/ 1 1) into 1
11.497 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
11.497 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.497 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
11.497 * [taylor]: Taking taylor expansion of 0 in M
11.497 * [backup-simplify]: Simplify 0 into 0
11.498 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.498 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.498 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.499 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.499 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.499 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ l h)))) into 0
11.499 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.500 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.500 * [taylor]: Taking taylor expansion of 0 in l
11.500 * [backup-simplify]: Simplify 0 into 0
11.500 * [taylor]: Taking taylor expansion of 0 in h
11.500 * [backup-simplify]: Simplify 0 into 0
11.500 * [taylor]: Taking taylor expansion of 0 in h
11.500 * [backup-simplify]: Simplify 0 into 0
11.501 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.501 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.501 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.501 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.502 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
11.502 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
11.502 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* (/ +nan.0 h) 0) (* (/ +nan.0 (pow h 2)) (/ 1 (* (pow M 2) (pow D 2)))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))
11.503 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))
11.503 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2)))))) in h
11.503 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))) in h
11.503 * [taylor]: Taking taylor expansion of +nan.0 in h
11.503 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.503 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2)))) in h
11.503 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (pow h 2))) in h
11.503 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.503 * [taylor]: Taking taylor expansion of M in h
11.503 * [backup-simplify]: Simplify M into M
11.503 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow h 2)) in h
11.503 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.503 * [taylor]: Taking taylor expansion of D in h
11.503 * [backup-simplify]: Simplify D into D
11.503 * [taylor]: Taking taylor expansion of (pow h 2) in h
11.503 * [taylor]: Taking taylor expansion of h in h
11.503 * [backup-simplify]: Simplify 0 into 0
11.503 * [backup-simplify]: Simplify 1 into 1
11.503 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.503 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.504 * [backup-simplify]: Simplify (* 1 1) into 1
11.504 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
11.504 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.504 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.505 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.505 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.505 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
11.505 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.506 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.506 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.506 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))) into 0
11.507 * [backup-simplify]: Simplify (- 0) into 0
11.507 * [taylor]: Taking taylor expansion of 0 in M
11.507 * [backup-simplify]: Simplify 0 into 0
11.507 * [taylor]: Taking taylor expansion of 0 in M
11.507 * [backup-simplify]: Simplify 0 into 0
11.508 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.508 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 1) (* 0 0))) into 0
11.509 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.509 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 (pow D 2)) (* 0 0))) into 0
11.510 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.510 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))) into 0
11.511 * [backup-simplify]: Simplify (- 0) into 0
11.511 * [taylor]: Taking taylor expansion of 0 in M
11.511 * [backup-simplify]: Simplify 0 into 0
11.511 * [taylor]: Taking taylor expansion of 0 in M
11.511 * [backup-simplify]: Simplify 0 into 0
11.511 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.511 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.512 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 (pow D 2))) into 0
11.512 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))))) into 0
11.513 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (/ 1 (pow D 2)))) into 0
11.513 * [backup-simplify]: Simplify (- 0) into 0
11.513 * [taylor]: Taking taylor expansion of 0 in D
11.513 * [backup-simplify]: Simplify 0 into 0
11.514 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.515 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
11.515 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
11.516 * [backup-simplify]: Simplify (- 0) into 0
11.516 * [backup-simplify]: Simplify 0 into 0
11.516 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.517 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.517 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.518 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.518 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.518 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ l h)))) into 0
11.519 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.520 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.520 * [taylor]: Taking taylor expansion of 0 in l
11.520 * [backup-simplify]: Simplify 0 into 0
11.520 * [taylor]: Taking taylor expansion of 0 in h
11.520 * [backup-simplify]: Simplify 0 into 0
11.520 * [taylor]: Taking taylor expansion of 0 in h
11.520 * [backup-simplify]: Simplify 0 into 0
11.520 * [taylor]: Taking taylor expansion of 0 in h
11.520 * [backup-simplify]: Simplify 0 into 0
11.520 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.521 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.522 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.522 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.522 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.522 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
11.523 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* (/ +nan.0 h) 0) (+ (* (/ +nan.0 (pow h 2)) 0) (* (/ +nan.0 (pow h 3)) (/ 1 (* (pow M 2) (pow D 2))))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))
11.524 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0)))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))
11.524 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3)))))) in h
11.524 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))) in h
11.524 * [taylor]: Taking taylor expansion of +nan.0 in h
11.524 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.524 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3)))) in h
11.524 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (pow h 3))) in h
11.524 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.524 * [taylor]: Taking taylor expansion of M in h
11.524 * [backup-simplify]: Simplify M into M
11.524 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow h 3)) in h
11.524 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.524 * [taylor]: Taking taylor expansion of D in h
11.524 * [backup-simplify]: Simplify D into D
11.524 * [taylor]: Taking taylor expansion of (pow h 3) in h
11.524 * [taylor]: Taking taylor expansion of h in h
11.524 * [backup-simplify]: Simplify 0 into 0
11.524 * [backup-simplify]: Simplify 1 into 1
11.524 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.524 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.524 * [backup-simplify]: Simplify (* 1 1) into 1
11.524 * [backup-simplify]: Simplify (* 1 1) into 1
11.525 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
11.525 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.525 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.525 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.526 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.526 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.526 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.527 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.527 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.527 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 1))) into 0
11.527 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.528 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
11.528 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.528 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.528 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.529 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.529 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.529 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.530 * [backup-simplify]: Simplify (- 0) into 0
11.530 * [taylor]: Taking taylor expansion of 0 in M
11.530 * [backup-simplify]: Simplify 0 into 0
11.530 * [taylor]: Taking taylor expansion of 0 in M
11.530 * [backup-simplify]: Simplify 0 into 0
11.530 * [taylor]: Taking taylor expansion of 0 in M
11.530 * [backup-simplify]: Simplify 0 into 0
11.530 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.531 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.531 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 1))) into 0
11.531 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.532 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.532 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.532 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.533 * [backup-simplify]: Simplify (- 0) into 0
11.533 * [taylor]: Taking taylor expansion of 0 in M
11.533 * [backup-simplify]: Simplify 0 into 0
11.533 * [taylor]: Taking taylor expansion of 0 in M
11.533 * [backup-simplify]: Simplify 0 into 0
11.533 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.534 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
11.534 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.535 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))) into 0
11.535 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.536 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))) into 0
11.536 * [backup-simplify]: Simplify (- 0) into 0
11.536 * [taylor]: Taking taylor expansion of 0 in M
11.536 * [backup-simplify]: Simplify 0 into 0
11.536 * [taylor]: Taking taylor expansion of 0 in M
11.536 * [backup-simplify]: Simplify 0 into 0
11.537 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.537 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.538 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.538 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
11.538 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2))))) into 0
11.539 * [backup-simplify]: Simplify (- 0) into 0
11.539 * [taylor]: Taking taylor expansion of 0 in D
11.539 * [backup-simplify]: Simplify 0 into 0
11.539 * [taylor]: Taking taylor expansion of 0 in D
11.539 * [backup-simplify]: Simplify 0 into 0
11.539 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.540 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.540 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (* 0 1))) into 0
11.540 * [backup-simplify]: Simplify (- 0) into 0
11.541 * [backup-simplify]: Simplify 0 into 0
11.541 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.542 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.543 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.543 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.543 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.544 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ l h)))) into 0
11.546 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.547 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2))))))))) into 0
11.547 * [taylor]: Taking taylor expansion of 0 in l
11.547 * [backup-simplify]: Simplify 0 into 0
11.548 * [taylor]: Taking taylor expansion of 0 in h
11.548 * [backup-simplify]: Simplify 0 into 0
11.548 * [taylor]: Taking taylor expansion of 0 in h
11.548 * [backup-simplify]: Simplify 0 into 0
11.548 * [taylor]: Taking taylor expansion of 0 in h
11.548 * [backup-simplify]: Simplify 0 into 0
11.548 * [taylor]: Taking taylor expansion of 0 in h
11.548 * [backup-simplify]: Simplify 0 into 0
11.549 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.550 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.551 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.552 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.552 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.553 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 (pow h 2)) 2) (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 3)))))) (* 2 0)) into (/ +nan.0 (pow h 4))
11.554 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* (/ +nan.0 h) 0) (+ (* (/ +nan.0 (pow h 2)) 0) (+ (* (/ +nan.0 (pow h 3)) 0) (* (/ +nan.0 (pow h 4)) (/ 1 (* (pow M 2) (pow D 2)))))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))))
11.556 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))))
11.556 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4)))))) in h
11.556 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))) in h
11.556 * [taylor]: Taking taylor expansion of +nan.0 in h
11.556 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.556 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4)))) in h
11.556 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (pow h 4))) in h
11.556 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.556 * [taylor]: Taking taylor expansion of M in h
11.556 * [backup-simplify]: Simplify M into M
11.556 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow h 4)) in h
11.556 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.556 * [taylor]: Taking taylor expansion of D in h
11.556 * [backup-simplify]: Simplify D into D
11.556 * [taylor]: Taking taylor expansion of (pow h 4) in h
11.556 * [taylor]: Taking taylor expansion of h in h
11.556 * [backup-simplify]: Simplify 0 into 0
11.556 * [backup-simplify]: Simplify 1 into 1
11.556 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.557 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.557 * [backup-simplify]: Simplify (* 1 1) into 1
11.557 * [backup-simplify]: Simplify (* 1 1) into 1
11.557 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
11.557 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.558 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.559 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.559 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.560 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.561 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.562 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.562 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.563 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.564 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.564 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.565 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.565 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.566 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 1))) into 0
11.567 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.567 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
11.568 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.569 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.569 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.569 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.570 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.570 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.571 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.572 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.573 * [backup-simplify]: Simplify (- 0) into 0
11.573 * [taylor]: Taking taylor expansion of 0 in M
11.573 * [backup-simplify]: Simplify 0 into 0
11.573 * [taylor]: Taking taylor expansion of 0 in M
11.573 * [backup-simplify]: Simplify 0 into 0
11.573 * [taylor]: Taking taylor expansion of 0 in M
11.573 * [backup-simplify]: Simplify 0 into 0
11.573 * [taylor]: Taking taylor expansion of 0 in M
11.573 * [backup-simplify]: Simplify 0 into 0
11.574 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.575 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.576 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.577 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.578 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.578 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.579 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.580 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.581 * [backup-simplify]: Simplify (- 0) into 0
11.581 * [taylor]: Taking taylor expansion of 0 in M
11.581 * [backup-simplify]: Simplify 0 into 0
11.581 * [taylor]: Taking taylor expansion of 0 in M
11.581 * [backup-simplify]: Simplify 0 into 0
11.581 * [taylor]: Taking taylor expansion of 0 in M
11.581 * [backup-simplify]: Simplify 0 into 0
11.582 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.583 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.584 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.585 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.586 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.587 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.588 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.589 * [backup-simplify]: Simplify (- 0) into 0
11.589 * [taylor]: Taking taylor expansion of 0 in M
11.589 * [backup-simplify]: Simplify 0 into 0
11.589 * [taylor]: Taking taylor expansion of 0 in M
11.589 * [backup-simplify]: Simplify 0 into 0
11.590 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.591 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
11.592 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.594 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0))))) into 0
11.594 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.596 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))) into 0
11.596 * [backup-simplify]: Simplify (- 0) into 0
11.596 * [taylor]: Taking taylor expansion of 0 in M
11.596 * [backup-simplify]: Simplify 0 into 0
11.596 * [taylor]: Taking taylor expansion of 0 in M
11.596 * [backup-simplify]: Simplify 0 into 0
11.596 * [taylor]: Taking taylor expansion of 0 in D
11.596 * [backup-simplify]: Simplify 0 into 0
11.596 * [taylor]: Taking taylor expansion of 0 in D
11.596 * [backup-simplify]: Simplify 0 into 0
11.596 * [taylor]: Taking taylor expansion of 0 in D
11.596 * [backup-simplify]: Simplify 0 into 0
11.597 * [taylor]: Taking taylor expansion of 0 in D
11.597 * [backup-simplify]: Simplify 0 into 0
11.602 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.603 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.604 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.605 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
11.606 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2)))))) into 0
11.606 * [backup-simplify]: Simplify (- 0) into 0
11.606 * [taylor]: Taking taylor expansion of 0 in D
11.606 * [backup-simplify]: Simplify 0 into 0
11.606 * [taylor]: Taking taylor expansion of 0 in D
11.606 * [backup-simplify]: Simplify 0 into 0
11.607 * [backup-simplify]: Simplify 0 into 0
11.608 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.609 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
11.610 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.610 * [backup-simplify]: Simplify (- 0) into 0
11.610 * [backup-simplify]: Simplify 0 into 0
11.612 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
11.614 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))))) into 0
11.615 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
11.616 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.617 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ l h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.617 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)) (* 2 (* 0 0)))) (* 2 (sqrt (/ l h)))) into 0
11.619 * [backup-simplify]: Simplify (+ (* (sqrt (/ l h)) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2))))))))) into 0
11.621 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ l h)) (/ 1 (* (pow M 2) (pow D 2)))))))))) into 0
11.621 * [taylor]: Taking taylor expansion of 0 in l
11.621 * [backup-simplify]: Simplify 0 into 0
11.621 * [taylor]: Taking taylor expansion of 0 in h
11.621 * [backup-simplify]: Simplify 0 into 0
11.622 * [taylor]: Taking taylor expansion of 0 in h
11.622 * [backup-simplify]: Simplify 0 into 0
11.622 * [taylor]: Taking taylor expansion of 0 in h
11.622 * [backup-simplify]: Simplify 0 into 0
11.622 * [taylor]: Taking taylor expansion of 0 in h
11.622 * [backup-simplify]: Simplify 0 into 0
11.622 * [taylor]: Taking taylor expansion of 0 in h
11.622 * [backup-simplify]: Simplify 0 into 0
11.623 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
11.625 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))))) into 0
11.626 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))))) into 0
11.627 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.627 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
11.628 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 4)))) (* 2 (* (/ +nan.0 (pow h 2)) (/ +nan.0 (pow h 3)))))) (* 2 0)) into (/ +nan.0 (pow h 5))
11.630 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* (/ +nan.0 h) 0) (+ (* (/ +nan.0 (pow h 2)) 0) (+ (* (/ +nan.0 (pow h 3)) 0) (+ (* (/ +nan.0 (pow h 4)) 0) (* (/ +nan.0 (pow h 5)) (/ 1 (* (pow M 2) (pow D 2))))))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5))))))
11.632 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 4))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 3))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 2))))))) (+ (* 0 (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) h)))))) (* 0 0)))))) into (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5))))))
11.632 * [taylor]: Taking taylor expansion of (- (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5)))))) in h
11.632 * [taylor]: Taking taylor expansion of (* +nan.0 (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5))))) in h
11.632 * [taylor]: Taking taylor expansion of +nan.0 in h
11.632 * [backup-simplify]: Simplify +nan.0 into +nan.0
11.632 * [taylor]: Taking taylor expansion of (/ 1 (* (pow M 2) (* (pow D 2) (pow h 5)))) in h
11.632 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (pow h 5))) in h
11.632 * [taylor]: Taking taylor expansion of (pow M 2) in h
11.632 * [taylor]: Taking taylor expansion of M in h
11.632 * [backup-simplify]: Simplify M into M
11.632 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow h 5)) in h
11.632 * [taylor]: Taking taylor expansion of (pow D 2) in h
11.632 * [taylor]: Taking taylor expansion of D in h
11.632 * [backup-simplify]: Simplify D into D
11.632 * [taylor]: Taking taylor expansion of (pow h 5) in h
11.632 * [taylor]: Taking taylor expansion of h in h
11.632 * [backup-simplify]: Simplify 0 into 0
11.632 * [backup-simplify]: Simplify 1 into 1
11.632 * [backup-simplify]: Simplify (* M M) into (pow M 2)
11.632 * [backup-simplify]: Simplify (* D D) into (pow D 2)
11.633 * [backup-simplify]: Simplify (* 1 1) into 1
11.633 * [backup-simplify]: Simplify (* 1 1) into 1
11.634 * [backup-simplify]: Simplify (* 1 1) into 1
11.634 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
11.634 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
11.634 * [backup-simplify]: Simplify (/ 1 (* (pow M 2) (pow D 2))) into (/ 1 (* (pow M 2) (pow D 2)))
11.635 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.636 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.637 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.638 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.639 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.640 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.641 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.642 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.643 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.643 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
11.644 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.644 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
11.645 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
11.647 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
11.647 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
11.648 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.649 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.649 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
11.650 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
11.651 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
11.652 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 1))) into 0
11.653 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
11.653 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
11.654 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.655 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.656 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
11.656 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.657 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2))))) into 0
11.657 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
11.658 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.658 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.659 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.661 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.661 * [backup-simplify]: Simplify (- 0) into 0
11.661 * [taylor]: Taking taylor expansion of 0 in M
11.661 * [backup-simplify]: Simplify 0 into 0
11.661 * [taylor]: Taking taylor expansion of 0 in M
11.661 * [backup-simplify]: Simplify 0 into 0
11.661 * [taylor]: Taking taylor expansion of 0 in M
11.662 * [backup-simplify]: Simplify 0 into 0
11.662 * [taylor]: Taking taylor expansion of 0 in M
11.662 * [backup-simplify]: Simplify 0 into 0
11.662 * [taylor]: Taking taylor expansion of 0 in M
11.662 * [backup-simplify]: Simplify 0 into 0
11.663 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.664 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.665 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.666 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.667 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.669 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.669 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.671 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.671 * [backup-simplify]: Simplify (- 0) into 0
11.672 * [taylor]: Taking taylor expansion of 0 in M
11.672 * [backup-simplify]: Simplify 0 into 0
11.672 * [taylor]: Taking taylor expansion of 0 in M
11.672 * [backup-simplify]: Simplify 0 into 0
11.672 * [taylor]: Taking taylor expansion of 0 in M
11.672 * [backup-simplify]: Simplify 0 into 0
11.672 * [taylor]: Taking taylor expansion of 0 in M
11.672 * [backup-simplify]: Simplify 0 into 0
11.673 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.674 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.675 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.676 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.678 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.679 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.680 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.682 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.682 * [backup-simplify]: Simplify (- 0) into 0
11.682 * [taylor]: Taking taylor expansion of 0 in M
11.682 * [backup-simplify]: Simplify 0 into 0
11.682 * [taylor]: Taking taylor expansion of 0 in M
11.682 * [backup-simplify]: Simplify 0 into 0
11.682 * [taylor]: Taking taylor expansion of 0 in M
11.682 * [backup-simplify]: Simplify 0 into 0
11.683 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.685 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.686 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.687 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M))))) into 0
11.688 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.689 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.690 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.691 * [backup-simplify]: Simplify (- 0) into 0
11.691 * [taylor]: Taking taylor expansion of 0 in M
11.691 * [backup-simplify]: Simplify 0 into 0
11.691 * [taylor]: Taking taylor expansion of 0 in M
11.691 * [backup-simplify]: Simplify 0 into 0
11.693 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))))) into 0
11.694 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))))) into 0
11.695 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))))) into 0
11.697 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 (pow D 2)) (* 0 0)))))) into 0
11.698 * [backup-simplify]: Simplify (- (+ (* (/ 1 (* (pow M 2) (pow D 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
11.700 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (* (pow M 2) (pow D 2)))))))) into 0
11.700 * [backup-simplify]: Simplify (- 0) into 0
11.700 * [taylor]: Taking taylor expansion of 0 in M
11.700 * [backup-simplify]: Simplify 0 into 0
11.700 * [taylor]: Taking taylor expansion of 0 in M
11.700 * [backup-simplify]: Simplify 0 into 0
11.700 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.701 * [taylor]: Taking taylor expansion of 0 in D
11.701 * [backup-simplify]: Simplify 0 into 0
11.703 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
11.704 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 1))))) into 0
11.705 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow D 2)))))) into 0
11.706 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow D 2)) (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))) (* 0 (/ 0 (pow D 2))))) into 0
11.708 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 (pow D 2))))))) into 0
11.708 * [backup-simplify]: Simplify (- 0) into 0
11.708 * [taylor]: Taking taylor expansion of 0 in D
11.708 * [backup-simplify]: Simplify 0 into 0
11.708 * [taylor]: Taking taylor expansion of 0 in D
11.708 * [backup-simplify]: Simplify 0 into 0
11.709 * [backup-simplify]: Simplify 0 into 0
11.709 * [backup-simplify]: Simplify 0 into 0
11.710 * [backup-simplify]: Simplify (* (- +nan.0) (* (pow (/ 1 (- D)) -2) (* (pow (/ 1 (- M)) -2) (* (/ 1 (/ 1 (- h))) (* (/ 1 (- l)) (/ 1 (- d))))))) into (* +nan.0 (/ (* (pow M 2) (* (pow D 2) h)) (* l d)))
11.710 * * * [progress]: simplifying candidates
11.710 * * * * [progress]: [ 1 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (pow (/ d l) 1/2) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.710 * * * * [progress]: [ 2 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (pow (sqrt (/ d l)) 1) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.710 * * * * [progress]: [ 3 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (exp (log (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.710 * * * * [progress]: [ 4 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (log (exp (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.710 * * * * [progress]: [ 5 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.710 * * * * [progress]: [ 6 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (cbrt (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.710 * * * * [progress]: [ 7 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (* (cbrt (/ d l)) (cbrt (/ d l)))) (sqrt (cbrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.710 * * * * [progress]: [ 8 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.710 * * * * [progress]: [ 9 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt l) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 10 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt l))) (sqrt (/ (cbrt d) (sqrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 11 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 12 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (sqrt d) (* (cbrt l) (cbrt l)))) (sqrt (/ (sqrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 13 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (sqrt d) (sqrt l))) (sqrt (/ (sqrt d) (sqrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 14 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 15 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 16 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ 1 (sqrt l))) (sqrt (/ d (sqrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 17 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ 1 1)) (sqrt (/ d l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 18 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt 1) (sqrt (/ d l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 19 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 20 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (/ (sqrt d) (sqrt l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.711 * * * * [progress]: [ 21 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (pow (/ d l) (/ 1 2)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 22 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 23 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (sqrt (/ d l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 24 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (sqrt d) (sqrt l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 25 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* 1 (sqrt (/ d l))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 26 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (posit16->real (real->posit16 (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 27 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (pow (/ d h) 1/2)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 28 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (pow (sqrt (/ d h)) 1)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 29 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (exp (log (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 30 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (log (exp (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 31 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 32 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (cbrt (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.712 * * * * [progress]: [ 33 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (* (cbrt (/ d h)) (cbrt (/ d h)))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 34 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 35 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h)))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 36 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h))) (sqrt (/ (cbrt d) (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 37 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 38 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h)))) (sqrt (/ (sqrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 39 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) (sqrt h))) (sqrt (/ (sqrt d) (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 40 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 41 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 42 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (sqrt h))) (sqrt (/ d (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 43 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 1)) (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.713 * * * * [progress]: [ 44 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt 1) (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 45 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt d) (sqrt (/ 1 h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 46 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (/ (sqrt d) (sqrt h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 47 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (pow (/ d h) (/ 1 2))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 48 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 49 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (fabs (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 50 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (fabs (/ (sqrt d) (sqrt h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 51 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* 1 (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 52 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (posit16->real (real->posit16 (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 53 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (pow (/ d h) 1/2)) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 54 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (pow (sqrt (/ d h)) 1)) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 55 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (exp (log (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 56 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (log (exp (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 57 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.714 * * * * [progress]: [ 58 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 59 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (* (cbrt (/ d h)) (cbrt (/ d h)))) (sqrt (cbrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 60 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 61 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h)))) (sqrt (/ (cbrt d) (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 62 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h))) (sqrt (/ (cbrt d) (sqrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 63 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 64 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h)))) (sqrt (/ (sqrt d) (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 65 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (sqrt d) (sqrt h))) (sqrt (/ (sqrt d) (sqrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 66 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 67 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 68 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (sqrt h))) (sqrt (/ d (sqrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 69 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 1)) (sqrt (/ d h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.715 * * * * [progress]: [ 70 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt 1) (sqrt (/ d h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 71 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt d) (sqrt (/ 1 h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 72 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (/ (sqrt d) (sqrt h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 73 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (pow (/ d h) (/ 1 2))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 74 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 75 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (fabs (sqrt (/ d h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 76 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (fabs (/ (sqrt d) (sqrt h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 77 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* 1 (sqrt (/ d h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 78 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (posit16->real (real->posit16 (sqrt (/ d h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.716 * * * * [progress]: [ 79 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
11.716 * * * * [progress]: [ 80 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
11.716 * * * * [progress]: [ 81 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
11.716 * * * * [progress]: [ 82 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
11.717 * * * * [progress]: [ 83 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
11.717 * * * * [progress]: [ 84 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
11.717 * * * * [progress]: [ 85 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
11.717 * * * * [progress]: [ 86 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
11.717 * * * * [progress]: [ 87 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
11.717 * * * * [progress]: [ 88 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.717 * * * * [progress]: [ 89 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.717 * * * * [progress]: [ 90 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.717 * * * * [progress]: [ 91 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
11.717 * * * * [progress]: [ 92 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
11.717 * * * * [progress]: [ 93 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 94 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 95 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.718 * * * * [progress]: [ 96 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 97 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 98 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 99 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 100 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.718 * * * * [progress]: [ 101 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 102 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 103 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.718 * * * * [progress]: [ 104 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.719 * * * * [progress]: [ 105 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.719 * * * * [progress]: [ 106 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (sqrt (/ d l))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.719 * * * * [progress]: [ 107 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
11.719 * * * * [progress]: [ 108 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
11.719 * * * * [progress]: [ 109 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.719 * * * * [progress]: [ 110 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.719 * * * * [progress]: [ 111 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.719 * * * * [progress]: [ 112 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
11.719 * * * * [progress]: [ 113 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
11.719 * * * * [progress]: [ 114 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.719 * * * * [progress]: [ 115 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 116 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.720 * * * * [progress]: [ 117 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 118 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 119 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 120 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 121 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.720 * * * * [progress]: [ 122 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 123 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 124 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 125 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
11.720 * * * * [progress]: [ 126 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 127 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (sqrt (/ d l)) (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 128 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (log (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 129 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (log (exp (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 130 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 131 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 132 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 133 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 134 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 135 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
11.721 * * * * [progress]: [ 136 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 137 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 138 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 139 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 140 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 141 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 142 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 143 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 144 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 145 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
11.722 * * * * [progress]: [ 146 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 147 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 148 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 149 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 150 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 151 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 152 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 153 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 154 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 155 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.723 * * * * [progress]: [ 156 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 157 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 158 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 159 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 160 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 161 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 162 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 163 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 164 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 165 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 166 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 167 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 168 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 169 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 170 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.724 * * * * [progress]: [ 171 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.725 * * * * [progress]: [ 172 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (cbrt (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (cbrt (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (cbrt (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.725 * * * * [progress]: [ 173 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.725 * * * * [progress]: [ 174 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (sqrt (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (sqrt (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.725 * * * * [progress]: [ 175 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt d) (sqrt d)) (* M (* M h))) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
11.725 * * * * [progress]: [ 176 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt d) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* (sqrt l) (sqrt h)) (/ 2 (/ D d)))) (* l 2))))>
11.725 * * * * [progress]: [ 177 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt d) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* (sqrt l) (sqrt h)) (/ 2 (/ D d)))) (* l 2))))>
11.725 * * * * [progress]: [ 178 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt (/ d l)) (sqrt d)) (* M (* M h))) (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
11.725 * * * * [progress]: [ 179 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt (/ d l)) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (sqrt h) (/ 2 (/ D d)))) (* l 2))))>
11.725 * * * * [progress]: [ 180 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt (/ d l)) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (sqrt h) (/ 2 (/ D d)))) (* l 2))))>
11.725 * * * * [progress]: [ 181 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt d) (sqrt (/ d h))) (* M (* M h))) (* (sqrt l) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
11.725 * * * * [progress]: [ 182 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt d) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (* (sqrt l) (/ 2 (/ D d)))) (* l 2))))>
11.725 * * * * [progress]: [ 183 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt d) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (sqrt l) (/ 2 (/ D d)))) (* l 2))))>
11.725 * * * * [progress]: [ 184 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* 1 (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))>
11.725 * * * * [progress]: [ 185 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))>
11.725 * * * * [progress]: [ 186 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (sqrt (/ d l)) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))>
11.725 * * * * [progress]: [ 187 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* M (* M h))) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (* l 2))))>
11.725 * * * * [progress]: [ 188 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (/ 2 (/ D d))) (* l 2))))>
11.725 * * * * [progress]: [ 189 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (/ 2 (/ D d))) (* l 2))))>
11.725 * * * * [progress]: [ 190 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt d) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (sqrt l) (sqrt h))) (* l 2))))>
11.725 * * * * [progress]: [ 191 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt (/ d l)) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (sqrt h)) (* l 2))))>
11.725 * * * * [progress]: [ 192 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (sqrt d) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (sqrt l)) (* l 2))))>
11.725 * * * * [progress]: [ 193 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (posit16->real (real->posit16 (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
11.726 * * * * [progress]: [ 194 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (sqrt (/ d l)) (sqrt (/ d h)))) (* l 2))))>
11.726 * * * * [progress]: [ 195 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* +nan.0 (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 196 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d)))))))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 197 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d)))))))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 198 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* +nan.0 (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 199 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 200 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 201 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* +nan.0 (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 202 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 203 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
11.726 * * * * [progress]: [ 204 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))>
11.726 * * * * [progress]: [ 205 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* +nan.0 (/ (* (pow M 2) (* (pow D 2) h)) (* l d))) (* l 2))))>
11.726 * * * * [progress]: [ 206 / 206 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* +nan.0 (/ (* (pow M 2) (* (pow D 2) h)) (* l d))) (* l 2))))>
11.728 * [simplify]: Simplifying:
  (log (sqrt (/ d l)))
  (exp (sqrt (/ d l)))
  (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l))))
  (cbrt (sqrt (/ d l)))
  (* (* (sqrt (/ d l)) (sqrt (/ d l))) (sqrt (/ d l)))
  (sqrt (* (cbrt (/ d l)) (cbrt (/ d l))))
  (sqrt (cbrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt l) (cbrt l))))
  (sqrt (/ (cbrt d) (cbrt l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt l)))
  (sqrt (/ (cbrt d) (sqrt l)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) l))
  (sqrt (/ (sqrt d) (* (cbrt l) (cbrt l))))
  (sqrt (/ (sqrt d) (cbrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) l))
  (sqrt (/ 1 (* (cbrt l) (cbrt l))))
  (sqrt (/ d (cbrt l)))
  (sqrt (/ 1 (sqrt l)))
  (sqrt (/ d (sqrt l)))
  (sqrt (/ 1 1))
  (sqrt (/ d l))
  (sqrt 1)
  (sqrt (/ d l))
  (sqrt d)
  (sqrt (/ 1 l))
  (sqrt d)
  (sqrt l)
  (/ 1 2)
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (real->posit16 (sqrt (/ d l)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))
  (sqrt (* (cbrt (/ d h)) (cbrt (/ d h))))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  (sqrt (/ 1 1))
  (sqrt (/ d h))
  (sqrt 1)
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  (/ 1 2)
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (log (sqrt (/ d h)))
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  (* (* (sqrt l) (sqrt h)) (/ 2 (/ D d)))
  (* (* (sqrt (/ d l)) (sqrt d)) (* M (* M h)))
  (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d))))
  (* (* (sqrt (/ d l)) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h)))
  (* (sqrt h) (/ 2 (/ D d)))
  (* (* (sqrt (/ d l)) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h)))
  (* (sqrt h) (/ 2 (/ D d)))
  (* (* (sqrt d) (sqrt (/ d h))) (* M (* M h)))
  (* (sqrt l) (* (/ 2 (/ D d)) (/ 2 (/ D d))))
  (* (* (sqrt d) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h)))
  (* (sqrt l) (/ 2 (/ D d)))
  (* (* (sqrt d) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h)))
  (* (sqrt l) (/ 2 (/ D d)))
  (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d))))
  (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* M (* M h)))
  (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h)))
  (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h)))
  (* (* (sqrt d) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (sqrt (/ d l)) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (sqrt d) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (real->posit16 (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (* +nan.0 (/ d l))
  (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
  (- (+ (* +nan.0 (/ 1 (* (pow l 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 l)) (- (* +nan.0 (/ 1 (* (pow l 2) d))))))))
  (* +nan.0 (/ d h))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (* +nan.0 (/ d h))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  0
  (* +nan.0 (/ (* (pow M 2) (* (pow D 2) h)) (* l d)))
  (* +nan.0 (/ (* (pow M 2) (* (pow D 2) h)) (* l d)))
11.734 * * [simplify]: iteration 1: (374 enodes)
11.914 * * [simplify]: iteration 2: (1626 enodes)
13.604 * * [simplify]: Extracting #0: cost 88 inf + 0
13.605 * * [simplify]: Extracting #1: cost 485 inf + 3
13.612 * * [simplify]: Extracting #2: cost 1034 inf + 4218
13.626 * * [simplify]: Extracting #3: cost 1058 inf + 25894
13.659 * * [simplify]: Extracting #4: cost 681 inf + 107389
13.760 * * [simplify]: Extracting #5: cost 137 inf + 298678
13.861 * * [simplify]: Extracting #6: cost 3 inf + 312969
13.967 * * [simplify]: Extracting #7: cost 0 inf + 303790
14.085 * * [simplify]: Extracting #8: cost 0 inf + 303430
14.177 * [simplify]: Simplified to:
  (log (sqrt (/ d l)))
  (exp (sqrt (/ d l)))
  (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l))))
  (cbrt (sqrt (/ d l)))
  (* (/ d l) (sqrt (/ d l)))
  (fabs (cbrt (/ d l)))
  (sqrt (cbrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (fabs (/ (cbrt d) (cbrt l)))
  (sqrt (/ (cbrt d) (cbrt l)))
  (sqrt (* (/ (cbrt d) (sqrt l)) (cbrt d)))
  (sqrt (/ (cbrt d) (sqrt l)))
  (fabs (cbrt d))
  (sqrt (/ (cbrt d) l))
  (sqrt (/ (/ (sqrt d) (cbrt l)) (cbrt l)))
  (sqrt (/ (sqrt d) (cbrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (/ (sqrt d) (sqrt l)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) l))
  (sqrt (/ 1 (* (cbrt l) (cbrt l))))
  (sqrt (/ d (cbrt l)))
  (sqrt (/ 1 (sqrt l)))
  (sqrt (/ d (sqrt l)))
  1
  (sqrt (/ d l))
  1
  (sqrt (/ d l))
  (sqrt d)
  (sqrt (/ 1 l))
  (sqrt d)
  (sqrt l)
  1/2
  (sqrt (sqrt (/ d l)))
  (sqrt (sqrt (/ d l)))
  (real->posit16 (sqrt (/ d l)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (sqrt (/ d h)) (/ d h))
  (fabs (cbrt (/ d h)))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (fabs (/ (cbrt d) (cbrt h)))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (* (/ (cbrt d) (sqrt h)) (cbrt d)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (fabs (cbrt d))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  1
  (sqrt (/ d h))
  1
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  1/2
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (sqrt (/ d h)) (/ d h))
  (fabs (cbrt (/ d h)))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (fabs (/ (cbrt d) (cbrt h)))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (* (/ (cbrt d) (sqrt h)) (cbrt d)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (fabs (cbrt d))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  1
  (sqrt (/ d h))
  1
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  1/2
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h))))
  (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h))))
  (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h))))
  (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h))))
  (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h))))
  (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (log (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (exp (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (* (cbrt (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h))))) (cbrt (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h))))))
  (cbrt (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (* (* (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (/ d l) (/ d h)))) (sqrt (/ d l))) (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))))
  (sqrt (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (sqrt (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (* (* M M) (* h d))
  (* (* (sqrt l) (sqrt h)) (/ 4 (* (/ D d) (/ D d))))
  (* d (* (* M h) (/ (* (/ M 2) D) d)))
  (* (sqrt h) (/ (* 2 (sqrt l)) (/ D d)))
  (* d (* (* M h) (/ (* (/ M 2) D) d)))
  (* (sqrt h) (/ (* 2 (sqrt l)) (/ D d)))
  (* (* (* (* M M) h) (sqrt (/ d l))) (sqrt d))
  (* (sqrt h) (/ 4 (* (/ D d) (/ D d))))
  (* (/ (/ (* M h) (/ 2 D)) d) (* (sqrt (/ d l)) (* (sqrt d) M)))
  (* (/ (* 2 (sqrt h)) D) d)
  (* (/ (/ (* M h) (/ 2 D)) d) (* (sqrt (/ d l)) (* (sqrt d) M)))
  (* (/ (* 2 (sqrt h)) D) d)
  (* (* (* (* M M) h) (sqrt d)) (sqrt (/ d h)))
  (/ (* (/ 4 (/ D d)) (sqrt l)) (/ D d))
  (/ (* (* (* (* M M) h) (sqrt d)) (sqrt (/ d h))) (* (/ 2 D) d))
  (/ (* 2 (sqrt l)) (/ D d))
  (/ (* (* (* (* M M) h) (sqrt d)) (sqrt (/ d h))) (* (/ 2 D) d))
  (/ (* 2 (sqrt l)) (/ D d))
  (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M 2)) (/ D d))
  (* (sqrt (/ d h)) (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))))
  (* (* (* (* M M) h) (sqrt (/ d l))) (sqrt (/ d h)))
  (* (* (* M h) (/ (* (/ M 2) D) d)) (* (sqrt (/ d l)) (sqrt (/ d h))))
  (* (* (* M h) (/ (* (/ M 2) D) d)) (* (sqrt (/ d l)) (sqrt (/ d h))))
  (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))))
  (* (* (* (/ (* (/ M 2) D) d) (* (sqrt d) (sqrt (/ d l)))) (/ (* (/ M 2) D) d)) h)
  (* (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)) (* h (* (sqrt (/ d h)) (sqrt d))))
  (real->posit16 (* (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d))) (* (sqrt (/ d l)) (sqrt (/ d h)))))
  (* +nan.0 (/ d l))
  (- (+ (- (/ +nan.0 (* (* l l) (* l (* d d)))) (/ +nan.0 l)) (/ +nan.0 (* (* d l) l))))
  (- (+ (- (/ +nan.0 (* (* l l) (* l (* d d)))) (/ +nan.0 l)) (/ +nan.0 (* (* d l) l))))
  (* +nan.0 (/ d h))
  (+ (/ (- +nan.0) (* d (* d (* (* h h) h)))) (- (/ +nan.0 (* h (* h d))) (/ +nan.0 h)))
  (+ (/ (- +nan.0) (* d (* d (* (* h h) h)))) (- (/ +nan.0 (* h (* h d))) (/ +nan.0 h)))
  (* +nan.0 (/ d h))
  (+ (/ (- +nan.0) (* d (* d (* (* h h) h)))) (- (/ +nan.0 (* h (* h d))) (/ +nan.0 h)))
  (+ (/ (- +nan.0) (* d (* d (* (* h h) h)))) (- (/ +nan.0 (* h (* h d))) (/ +nan.0 h)))
  0
  (* (* (/ (* (* M D) (* M D)) l) (/ h d)) +nan.0)
  (* (* (/ (* (* M D) (* M D)) l) (/ h d)) +nan.0)
14.223 * * * [progress]: adding candidates to table
18.547 * * [progress]: iteration 3 / 4
18.547 * * * [progress]: picking best candidate
18.749 * * * * [pick]: Picked  #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
18.749 * * * [progress]: localizing error
18.875 * * * [progress]: generating rewritten candidates
18.875 * * * * [progress]: [ 1 / 4 ] rewriting at (2 2 1 1 2)
18.879 * * * * [progress]: [ 2 / 4 ] rewriting at (2 1 2)
18.883 * * * * [progress]: [ 3 / 4 ] rewriting at (2 2 1)
19.218 * * * * [progress]: [ 4 / 4 ] rewriting at (2 2)
19.604 * * * [progress]: generating series expansions
19.604 * * * * [progress]: [ 1 / 4 ] generating series at (2 2 1 1 2)
19.604 * [backup-simplify]: Simplify (sqrt (/ d h)) into (sqrt (/ d h))
19.604 * [approximate]: Taking taylor expansion of (sqrt (/ d h)) in (d h) around 0
19.604 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in h
19.604 * [taylor]: Taking taylor expansion of (/ d h) in h
19.604 * [taylor]: Taking taylor expansion of d in h
19.605 * [backup-simplify]: Simplify d into d
19.605 * [taylor]: Taking taylor expansion of h in h
19.605 * [backup-simplify]: Simplify 0 into 0
19.605 * [backup-simplify]: Simplify 1 into 1
19.605 * [backup-simplify]: Simplify (/ d 1) into d
19.605 * [backup-simplify]: Simplify (sqrt 0) into 0
19.606 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
19.606 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
19.606 * [taylor]: Taking taylor expansion of (/ d h) in d
19.606 * [taylor]: Taking taylor expansion of d in d
19.606 * [backup-simplify]: Simplify 0 into 0
19.606 * [backup-simplify]: Simplify 1 into 1
19.606 * [taylor]: Taking taylor expansion of h in d
19.606 * [backup-simplify]: Simplify h into h
19.606 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.606 * [backup-simplify]: Simplify (sqrt 0) into 0
19.606 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
19.606 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
19.606 * [taylor]: Taking taylor expansion of (/ d h) in d
19.606 * [taylor]: Taking taylor expansion of d in d
19.607 * [backup-simplify]: Simplify 0 into 0
19.607 * [backup-simplify]: Simplify 1 into 1
19.607 * [taylor]: Taking taylor expansion of h in d
19.607 * [backup-simplify]: Simplify h into h
19.607 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.607 * [backup-simplify]: Simplify (sqrt 0) into 0
19.607 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
19.608 * [taylor]: Taking taylor expansion of 0 in h
19.608 * [backup-simplify]: Simplify 0 into 0
19.608 * [taylor]: Taking taylor expansion of (/ +nan.0 h) in h
19.608 * [taylor]: Taking taylor expansion of +nan.0 in h
19.608 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.608 * [taylor]: Taking taylor expansion of h in h
19.608 * [backup-simplify]: Simplify 0 into 0
19.608 * [backup-simplify]: Simplify 1 into 1
19.608 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
19.608 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.608 * [backup-simplify]: Simplify 0 into 0
19.608 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
19.609 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
19.609 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 2)) in h
19.609 * [taylor]: Taking taylor expansion of +nan.0 in h
19.609 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.609 * [taylor]: Taking taylor expansion of (pow h 2) in h
19.609 * [taylor]: Taking taylor expansion of h in h
19.609 * [backup-simplify]: Simplify 0 into 0
19.609 * [backup-simplify]: Simplify 1 into 1
19.609 * [backup-simplify]: Simplify (* 1 1) into 1
19.609 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
19.610 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.610 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
19.610 * [backup-simplify]: Simplify 0 into 0
19.611 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
19.611 * [backup-simplify]: Simplify 0 into 0
19.611 * [backup-simplify]: Simplify 0 into 0
19.611 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
19.612 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
19.612 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 3)) in h
19.612 * [taylor]: Taking taylor expansion of +nan.0 in h
19.612 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.612 * [taylor]: Taking taylor expansion of (pow h 3) in h
19.612 * [taylor]: Taking taylor expansion of h in h
19.612 * [backup-simplify]: Simplify 0 into 0
19.612 * [backup-simplify]: Simplify 1 into 1
19.612 * [backup-simplify]: Simplify (* 1 1) into 1
19.612 * [backup-simplify]: Simplify (* 1 1) into 1
19.613 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
19.613 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.614 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.614 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.615 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.615 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
19.616 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.616 * [backup-simplify]: Simplify 0 into 0
19.616 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.617 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.617 * [backup-simplify]: Simplify 0 into 0
19.617 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 h) d)) into (* +nan.0 (/ d h))
19.617 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 h))) into (sqrt (/ h d))
19.617 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
19.617 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
19.617 * [taylor]: Taking taylor expansion of (/ h d) in h
19.617 * [taylor]: Taking taylor expansion of h in h
19.617 * [backup-simplify]: Simplify 0 into 0
19.617 * [backup-simplify]: Simplify 1 into 1
19.617 * [taylor]: Taking taylor expansion of d in h
19.617 * [backup-simplify]: Simplify d into d
19.617 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
19.617 * [backup-simplify]: Simplify (sqrt 0) into 0
19.618 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
19.618 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
19.618 * [taylor]: Taking taylor expansion of (/ h d) in d
19.618 * [taylor]: Taking taylor expansion of h in d
19.618 * [backup-simplify]: Simplify h into h
19.618 * [taylor]: Taking taylor expansion of d in d
19.618 * [backup-simplify]: Simplify 0 into 0
19.618 * [backup-simplify]: Simplify 1 into 1
19.618 * [backup-simplify]: Simplify (/ h 1) into h
19.618 * [backup-simplify]: Simplify (sqrt 0) into 0
19.618 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
19.619 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
19.619 * [taylor]: Taking taylor expansion of (/ h d) in d
19.619 * [taylor]: Taking taylor expansion of h in d
19.619 * [backup-simplify]: Simplify h into h
19.619 * [taylor]: Taking taylor expansion of d in d
19.619 * [backup-simplify]: Simplify 0 into 0
19.619 * [backup-simplify]: Simplify 1 into 1
19.619 * [backup-simplify]: Simplify (/ h 1) into h
19.619 * [backup-simplify]: Simplify (sqrt 0) into 0
19.619 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
19.619 * [taylor]: Taking taylor expansion of 0 in h
19.619 * [backup-simplify]: Simplify 0 into 0
19.619 * [backup-simplify]: Simplify 0 into 0
19.619 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
19.619 * [taylor]: Taking taylor expansion of +nan.0 in h
19.619 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.619 * [taylor]: Taking taylor expansion of h in h
19.619 * [backup-simplify]: Simplify 0 into 0
19.619 * [backup-simplify]: Simplify 1 into 1
19.620 * [backup-simplify]: Simplify (* +nan.0 0) into 0
19.620 * [backup-simplify]: Simplify 0 into 0
19.620 * [backup-simplify]: Simplify 0 into 0
19.621 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
19.622 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
19.622 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
19.622 * [taylor]: Taking taylor expansion of +nan.0 in h
19.622 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.622 * [taylor]: Taking taylor expansion of (pow h 2) in h
19.622 * [taylor]: Taking taylor expansion of h in h
19.622 * [backup-simplify]: Simplify 0 into 0
19.622 * [backup-simplify]: Simplify 1 into 1
19.623 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
19.624 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
19.624 * [backup-simplify]: Simplify 0 into 0
19.625 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.626 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
19.626 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
19.626 * [taylor]: Taking taylor expansion of +nan.0 in h
19.626 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.626 * [taylor]: Taking taylor expansion of (pow h 3) in h
19.626 * [taylor]: Taking taylor expansion of h in h
19.626 * [backup-simplify]: Simplify 0 into 0
19.626 * [backup-simplify]: Simplify 1 into 1
19.627 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
19.627 * [backup-simplify]: Simplify 0 into 0
19.627 * [backup-simplify]: Simplify 0 into 0
19.629 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.630 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
19.630 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
19.630 * [taylor]: Taking taylor expansion of +nan.0 in h
19.630 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.630 * [taylor]: Taking taylor expansion of (pow h 4) in h
19.630 * [taylor]: Taking taylor expansion of h in h
19.630 * [backup-simplify]: Simplify 0 into 0
19.630 * [backup-simplify]: Simplify 1 into 1
19.631 * [backup-simplify]: Simplify (* 1 1) into 1
19.631 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
19.631 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.632 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
19.632 * [backup-simplify]: Simplify 0 into 0
19.632 * [backup-simplify]: Simplify 0 into 0
19.635 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.636 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
19.636 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
19.636 * [taylor]: Taking taylor expansion of +nan.0 in h
19.636 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.636 * [taylor]: Taking taylor expansion of (pow h 5) in h
19.636 * [taylor]: Taking taylor expansion of h in h
19.636 * [backup-simplify]: Simplify 0 into 0
19.636 * [backup-simplify]: Simplify 1 into 1
19.636 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.637 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
19.637 * [backup-simplify]: Simplify 0 into 0
19.639 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
19.639 * [backup-simplify]: Simplify 0 into 0
19.639 * [backup-simplify]: Simplify 0 into 0
19.641 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.643 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
19.643 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
19.643 * [taylor]: Taking taylor expansion of +nan.0 in h
19.643 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.643 * [taylor]: Taking taylor expansion of (pow h 6) in h
19.643 * [taylor]: Taking taylor expansion of h in h
19.643 * [backup-simplify]: Simplify 0 into 0
19.643 * [backup-simplify]: Simplify 1 into 1
19.643 * [backup-simplify]: Simplify (* 1 1) into 1
19.644 * [backup-simplify]: Simplify (* 1 1) into 1
19.644 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
19.644 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.645 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 h) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 h) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 h) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
19.645 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- h)))) into (sqrt (/ h d))
19.645 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
19.645 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
19.645 * [taylor]: Taking taylor expansion of (/ h d) in h
19.645 * [taylor]: Taking taylor expansion of h in h
19.645 * [backup-simplify]: Simplify 0 into 0
19.645 * [backup-simplify]: Simplify 1 into 1
19.645 * [taylor]: Taking taylor expansion of d in h
19.645 * [backup-simplify]: Simplify d into d
19.645 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
19.646 * [backup-simplify]: Simplify (sqrt 0) into 0
19.646 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
19.646 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
19.646 * [taylor]: Taking taylor expansion of (/ h d) in d
19.646 * [taylor]: Taking taylor expansion of h in d
19.647 * [backup-simplify]: Simplify h into h
19.647 * [taylor]: Taking taylor expansion of d in d
19.647 * [backup-simplify]: Simplify 0 into 0
19.647 * [backup-simplify]: Simplify 1 into 1
19.647 * [backup-simplify]: Simplify (/ h 1) into h
19.647 * [backup-simplify]: Simplify (sqrt 0) into 0
19.648 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
19.648 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
19.648 * [taylor]: Taking taylor expansion of (/ h d) in d
19.648 * [taylor]: Taking taylor expansion of h in d
19.648 * [backup-simplify]: Simplify h into h
19.648 * [taylor]: Taking taylor expansion of d in d
19.648 * [backup-simplify]: Simplify 0 into 0
19.648 * [backup-simplify]: Simplify 1 into 1
19.648 * [backup-simplify]: Simplify (/ h 1) into h
19.648 * [backup-simplify]: Simplify (sqrt 0) into 0
19.649 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
19.649 * [taylor]: Taking taylor expansion of 0 in h
19.649 * [backup-simplify]: Simplify 0 into 0
19.649 * [backup-simplify]: Simplify 0 into 0
19.649 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
19.649 * [taylor]: Taking taylor expansion of +nan.0 in h
19.649 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.649 * [taylor]: Taking taylor expansion of h in h
19.649 * [backup-simplify]: Simplify 0 into 0
19.649 * [backup-simplify]: Simplify 1 into 1
19.650 * [backup-simplify]: Simplify (* +nan.0 0) into 0
19.650 * [backup-simplify]: Simplify 0 into 0
19.650 * [backup-simplify]: Simplify 0 into 0
19.651 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
19.651 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
19.652 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
19.652 * [taylor]: Taking taylor expansion of +nan.0 in h
19.652 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.652 * [taylor]: Taking taylor expansion of (pow h 2) in h
19.652 * [taylor]: Taking taylor expansion of h in h
19.652 * [backup-simplify]: Simplify 0 into 0
19.652 * [backup-simplify]: Simplify 1 into 1
19.653 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
19.654 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
19.654 * [backup-simplify]: Simplify 0 into 0
19.655 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.656 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
19.656 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
19.657 * [taylor]: Taking taylor expansion of +nan.0 in h
19.657 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.657 * [taylor]: Taking taylor expansion of (pow h 3) in h
19.657 * [taylor]: Taking taylor expansion of h in h
19.657 * [backup-simplify]: Simplify 0 into 0
19.657 * [backup-simplify]: Simplify 1 into 1
19.658 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
19.658 * [backup-simplify]: Simplify 0 into 0
19.658 * [backup-simplify]: Simplify 0 into 0
19.660 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.661 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
19.661 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
19.661 * [taylor]: Taking taylor expansion of +nan.0 in h
19.661 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.661 * [taylor]: Taking taylor expansion of (pow h 4) in h
19.661 * [taylor]: Taking taylor expansion of h in h
19.661 * [backup-simplify]: Simplify 0 into 0
19.661 * [backup-simplify]: Simplify 1 into 1
19.662 * [backup-simplify]: Simplify (* 1 1) into 1
19.662 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
19.662 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.664 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
19.664 * [backup-simplify]: Simplify 0 into 0
19.664 * [backup-simplify]: Simplify 0 into 0
19.666 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.667 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
19.668 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
19.668 * [taylor]: Taking taylor expansion of +nan.0 in h
19.668 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.668 * [taylor]: Taking taylor expansion of (pow h 5) in h
19.668 * [taylor]: Taking taylor expansion of h in h
19.668 * [backup-simplify]: Simplify 0 into 0
19.668 * [backup-simplify]: Simplify 1 into 1
19.669 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.669 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
19.669 * [backup-simplify]: Simplify 0 into 0
19.671 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
19.671 * [backup-simplify]: Simplify 0 into 0
19.671 * [backup-simplify]: Simplify 0 into 0
19.674 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.675 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
19.675 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
19.675 * [taylor]: Taking taylor expansion of +nan.0 in h
19.675 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.675 * [taylor]: Taking taylor expansion of (pow h 6) in h
19.675 * [taylor]: Taking taylor expansion of h in h
19.676 * [backup-simplify]: Simplify 0 into 0
19.676 * [backup-simplify]: Simplify 1 into 1
19.676 * [backup-simplify]: Simplify (* 1 1) into 1
19.676 * [backup-simplify]: Simplify (* 1 1) into 1
19.677 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
19.677 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.678 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- h)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- h)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- h)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
19.678 * * * * [progress]: [ 2 / 4 ] generating series at (2 1 2)
19.678 * [backup-simplify]: Simplify (sqrt (/ d h)) into (sqrt (/ d h))
19.678 * [approximate]: Taking taylor expansion of (sqrt (/ d h)) in (d h) around 0
19.678 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in h
19.678 * [taylor]: Taking taylor expansion of (/ d h) in h
19.678 * [taylor]: Taking taylor expansion of d in h
19.678 * [backup-simplify]: Simplify d into d
19.678 * [taylor]: Taking taylor expansion of h in h
19.678 * [backup-simplify]: Simplify 0 into 0
19.678 * [backup-simplify]: Simplify 1 into 1
19.678 * [backup-simplify]: Simplify (/ d 1) into d
19.679 * [backup-simplify]: Simplify (sqrt 0) into 0
19.693 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
19.693 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
19.693 * [taylor]: Taking taylor expansion of (/ d h) in d
19.693 * [taylor]: Taking taylor expansion of d in d
19.693 * [backup-simplify]: Simplify 0 into 0
19.693 * [backup-simplify]: Simplify 1 into 1
19.694 * [taylor]: Taking taylor expansion of h in d
19.694 * [backup-simplify]: Simplify h into h
19.694 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.694 * [backup-simplify]: Simplify (sqrt 0) into 0
19.695 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
19.695 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
19.695 * [taylor]: Taking taylor expansion of (/ d h) in d
19.695 * [taylor]: Taking taylor expansion of d in d
19.695 * [backup-simplify]: Simplify 0 into 0
19.695 * [backup-simplify]: Simplify 1 into 1
19.695 * [taylor]: Taking taylor expansion of h in d
19.695 * [backup-simplify]: Simplify h into h
19.695 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.695 * [backup-simplify]: Simplify (sqrt 0) into 0
19.696 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
19.696 * [taylor]: Taking taylor expansion of 0 in h
19.696 * [backup-simplify]: Simplify 0 into 0
19.696 * [taylor]: Taking taylor expansion of (/ +nan.0 h) in h
19.696 * [taylor]: Taking taylor expansion of +nan.0 in h
19.696 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.696 * [taylor]: Taking taylor expansion of h in h
19.696 * [backup-simplify]: Simplify 0 into 0
19.696 * [backup-simplify]: Simplify 1 into 1
19.697 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
19.697 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.697 * [backup-simplify]: Simplify 0 into 0
19.697 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
19.698 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
19.698 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 2)) in h
19.698 * [taylor]: Taking taylor expansion of +nan.0 in h
19.698 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.698 * [taylor]: Taking taylor expansion of (pow h 2) in h
19.698 * [taylor]: Taking taylor expansion of h in h
19.698 * [backup-simplify]: Simplify 0 into 0
19.698 * [backup-simplify]: Simplify 1 into 1
19.698 * [backup-simplify]: Simplify (* 1 1) into 1
19.699 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
19.700 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.700 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
19.700 * [backup-simplify]: Simplify 0 into 0
19.701 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
19.701 * [backup-simplify]: Simplify 0 into 0
19.701 * [backup-simplify]: Simplify 0 into 0
19.702 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
19.702 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
19.702 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 3)) in h
19.702 * [taylor]: Taking taylor expansion of +nan.0 in h
19.702 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.702 * [taylor]: Taking taylor expansion of (pow h 3) in h
19.702 * [taylor]: Taking taylor expansion of h in h
19.702 * [backup-simplify]: Simplify 0 into 0
19.703 * [backup-simplify]: Simplify 1 into 1
19.703 * [backup-simplify]: Simplify (* 1 1) into 1
19.703 * [backup-simplify]: Simplify (* 1 1) into 1
19.704 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
19.705 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.705 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.706 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.707 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.707 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
19.709 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.709 * [backup-simplify]: Simplify 0 into 0
19.710 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.711 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.711 * [backup-simplify]: Simplify 0 into 0
19.711 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 h) d)) into (* +nan.0 (/ d h))
19.711 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 h))) into (sqrt (/ h d))
19.711 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
19.711 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
19.711 * [taylor]: Taking taylor expansion of (/ h d) in h
19.711 * [taylor]: Taking taylor expansion of h in h
19.711 * [backup-simplify]: Simplify 0 into 0
19.711 * [backup-simplify]: Simplify 1 into 1
19.711 * [taylor]: Taking taylor expansion of d in h
19.711 * [backup-simplify]: Simplify d into d
19.711 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
19.712 * [backup-simplify]: Simplify (sqrt 0) into 0
19.712 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
19.712 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
19.712 * [taylor]: Taking taylor expansion of (/ h d) in d
19.713 * [taylor]: Taking taylor expansion of h in d
19.713 * [backup-simplify]: Simplify h into h
19.713 * [taylor]: Taking taylor expansion of d in d
19.713 * [backup-simplify]: Simplify 0 into 0
19.713 * [backup-simplify]: Simplify 1 into 1
19.713 * [backup-simplify]: Simplify (/ h 1) into h
19.713 * [backup-simplify]: Simplify (sqrt 0) into 0
19.714 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
19.714 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
19.714 * [taylor]: Taking taylor expansion of (/ h d) in d
19.714 * [taylor]: Taking taylor expansion of h in d
19.714 * [backup-simplify]: Simplify h into h
19.714 * [taylor]: Taking taylor expansion of d in d
19.714 * [backup-simplify]: Simplify 0 into 0
19.714 * [backup-simplify]: Simplify 1 into 1
19.714 * [backup-simplify]: Simplify (/ h 1) into h
19.714 * [backup-simplify]: Simplify (sqrt 0) into 0
19.715 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
19.715 * [taylor]: Taking taylor expansion of 0 in h
19.715 * [backup-simplify]: Simplify 0 into 0
19.715 * [backup-simplify]: Simplify 0 into 0
19.715 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
19.715 * [taylor]: Taking taylor expansion of +nan.0 in h
19.715 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.715 * [taylor]: Taking taylor expansion of h in h
19.715 * [backup-simplify]: Simplify 0 into 0
19.715 * [backup-simplify]: Simplify 1 into 1
19.716 * [backup-simplify]: Simplify (* +nan.0 0) into 0
19.716 * [backup-simplify]: Simplify 0 into 0
19.716 * [backup-simplify]: Simplify 0 into 0
19.716 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
19.717 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
19.717 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
19.717 * [taylor]: Taking taylor expansion of +nan.0 in h
19.717 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.717 * [taylor]: Taking taylor expansion of (pow h 2) in h
19.717 * [taylor]: Taking taylor expansion of h in h
19.718 * [backup-simplify]: Simplify 0 into 0
19.718 * [backup-simplify]: Simplify 1 into 1
19.719 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
19.719 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
19.719 * [backup-simplify]: Simplify 0 into 0
19.721 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.722 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
19.722 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
19.722 * [taylor]: Taking taylor expansion of +nan.0 in h
19.722 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.722 * [taylor]: Taking taylor expansion of (pow h 3) in h
19.722 * [taylor]: Taking taylor expansion of h in h
19.722 * [backup-simplify]: Simplify 0 into 0
19.722 * [backup-simplify]: Simplify 1 into 1
19.723 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
19.723 * [backup-simplify]: Simplify 0 into 0
19.723 * [backup-simplify]: Simplify 0 into 0
19.725 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.726 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
19.726 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
19.726 * [taylor]: Taking taylor expansion of +nan.0 in h
19.726 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.726 * [taylor]: Taking taylor expansion of (pow h 4) in h
19.726 * [taylor]: Taking taylor expansion of h in h
19.726 * [backup-simplify]: Simplify 0 into 0
19.726 * [backup-simplify]: Simplify 1 into 1
19.726 * [backup-simplify]: Simplify (* 1 1) into 1
19.727 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
19.727 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.728 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
19.728 * [backup-simplify]: Simplify 0 into 0
19.728 * [backup-simplify]: Simplify 0 into 0
19.730 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.731 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
19.731 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
19.731 * [taylor]: Taking taylor expansion of +nan.0 in h
19.731 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.731 * [taylor]: Taking taylor expansion of (pow h 5) in h
19.731 * [taylor]: Taking taylor expansion of h in h
19.732 * [backup-simplify]: Simplify 0 into 0
19.732 * [backup-simplify]: Simplify 1 into 1
19.732 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.733 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
19.733 * [backup-simplify]: Simplify 0 into 0
19.734 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
19.734 * [backup-simplify]: Simplify 0 into 0
19.734 * [backup-simplify]: Simplify 0 into 0
19.737 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.738 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
19.738 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
19.738 * [taylor]: Taking taylor expansion of +nan.0 in h
19.738 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.739 * [taylor]: Taking taylor expansion of (pow h 6) in h
19.739 * [taylor]: Taking taylor expansion of h in h
19.739 * [backup-simplify]: Simplify 0 into 0
19.739 * [backup-simplify]: Simplify 1 into 1
19.739 * [backup-simplify]: Simplify (* 1 1) into 1
19.739 * [backup-simplify]: Simplify (* 1 1) into 1
19.740 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
19.740 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.741 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 h) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 h) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 h) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
19.741 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- h)))) into (sqrt (/ h d))
19.741 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
19.741 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
19.741 * [taylor]: Taking taylor expansion of (/ h d) in h
19.741 * [taylor]: Taking taylor expansion of h in h
19.741 * [backup-simplify]: Simplify 0 into 0
19.741 * [backup-simplify]: Simplify 1 into 1
19.741 * [taylor]: Taking taylor expansion of d in h
19.741 * [backup-simplify]: Simplify d into d
19.741 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
19.742 * [backup-simplify]: Simplify (sqrt 0) into 0
19.742 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
19.742 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
19.742 * [taylor]: Taking taylor expansion of (/ h d) in d
19.742 * [taylor]: Taking taylor expansion of h in d
19.742 * [backup-simplify]: Simplify h into h
19.742 * [taylor]: Taking taylor expansion of d in d
19.742 * [backup-simplify]: Simplify 0 into 0
19.742 * [backup-simplify]: Simplify 1 into 1
19.742 * [backup-simplify]: Simplify (/ h 1) into h
19.743 * [backup-simplify]: Simplify (sqrt 0) into 0
19.743 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
19.743 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
19.743 * [taylor]: Taking taylor expansion of (/ h d) in d
19.743 * [taylor]: Taking taylor expansion of h in d
19.743 * [backup-simplify]: Simplify h into h
19.743 * [taylor]: Taking taylor expansion of d in d
19.743 * [backup-simplify]: Simplify 0 into 0
19.744 * [backup-simplify]: Simplify 1 into 1
19.744 * [backup-simplify]: Simplify (/ h 1) into h
19.744 * [backup-simplify]: Simplify (sqrt 0) into 0
19.744 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
19.745 * [taylor]: Taking taylor expansion of 0 in h
19.745 * [backup-simplify]: Simplify 0 into 0
19.745 * [backup-simplify]: Simplify 0 into 0
19.745 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
19.745 * [taylor]: Taking taylor expansion of +nan.0 in h
19.745 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.745 * [taylor]: Taking taylor expansion of h in h
19.745 * [backup-simplify]: Simplify 0 into 0
19.745 * [backup-simplify]: Simplify 1 into 1
19.745 * [backup-simplify]: Simplify (* +nan.0 0) into 0
19.745 * [backup-simplify]: Simplify 0 into 0
19.745 * [backup-simplify]: Simplify 0 into 0
19.746 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
19.747 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
19.747 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
19.747 * [taylor]: Taking taylor expansion of +nan.0 in h
19.747 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.747 * [taylor]: Taking taylor expansion of (pow h 2) in h
19.747 * [taylor]: Taking taylor expansion of h in h
19.747 * [backup-simplify]: Simplify 0 into 0
19.747 * [backup-simplify]: Simplify 1 into 1
19.749 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
19.749 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
19.749 * [backup-simplify]: Simplify 0 into 0
19.750 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.751 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
19.751 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
19.751 * [taylor]: Taking taylor expansion of +nan.0 in h
19.751 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.751 * [taylor]: Taking taylor expansion of (pow h 3) in h
19.751 * [taylor]: Taking taylor expansion of h in h
19.751 * [backup-simplify]: Simplify 0 into 0
19.751 * [backup-simplify]: Simplify 1 into 1
19.752 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
19.752 * [backup-simplify]: Simplify 0 into 0
19.753 * [backup-simplify]: Simplify 0 into 0
19.755 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.755 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
19.755 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
19.756 * [taylor]: Taking taylor expansion of +nan.0 in h
19.756 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.756 * [taylor]: Taking taylor expansion of (pow h 4) in h
19.756 * [taylor]: Taking taylor expansion of h in h
19.756 * [backup-simplify]: Simplify 0 into 0
19.756 * [backup-simplify]: Simplify 1 into 1
19.756 * [backup-simplify]: Simplify (* 1 1) into 1
19.757 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
19.757 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.758 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
19.758 * [backup-simplify]: Simplify 0 into 0
19.758 * [backup-simplify]: Simplify 0 into 0
19.761 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.762 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
19.762 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
19.762 * [taylor]: Taking taylor expansion of +nan.0 in h
19.762 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.762 * [taylor]: Taking taylor expansion of (pow h 5) in h
19.762 * [taylor]: Taking taylor expansion of h in h
19.762 * [backup-simplify]: Simplify 0 into 0
19.762 * [backup-simplify]: Simplify 1 into 1
19.762 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.763 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
19.763 * [backup-simplify]: Simplify 0 into 0
19.764 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
19.764 * [backup-simplify]: Simplify 0 into 0
19.764 * [backup-simplify]: Simplify 0 into 0
19.766 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.766 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
19.767 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
19.767 * [taylor]: Taking taylor expansion of +nan.0 in h
19.767 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.767 * [taylor]: Taking taylor expansion of (pow h 6) in h
19.767 * [taylor]: Taking taylor expansion of h in h
19.767 * [backup-simplify]: Simplify 0 into 0
19.767 * [backup-simplify]: Simplify 1 into 1
19.767 * [backup-simplify]: Simplify (* 1 1) into 1
19.767 * [backup-simplify]: Simplify (* 1 1) into 1
19.767 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
19.767 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.768 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- h)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- h)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- h)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
19.768 * * * * [progress]: [ 3 / 4 ] generating series at (2 2 1)
19.768 * [backup-simplify]: Simplify (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) into (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))))
19.769 * [approximate]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in (d l h M D) around 0
19.769 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in D
19.769 * [taylor]: Taking taylor expansion of 1/4 in D
19.769 * [backup-simplify]: Simplify 1/4 into 1/4
19.769 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in D
19.769 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in D
19.769 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in D
19.769 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in D
19.769 * [taylor]: Taking taylor expansion of 1/6 in D
19.769 * [backup-simplify]: Simplify 1/6 into 1/6
19.769 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in D
19.769 * [taylor]: Taking taylor expansion of (/ 1 l) in D
19.769 * [taylor]: Taking taylor expansion of l in D
19.769 * [backup-simplify]: Simplify l into l
19.769 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
19.769 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
19.769 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
19.769 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
19.769 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in D
19.769 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in D
19.769 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in D
19.769 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in D
19.769 * [taylor]: Taking taylor expansion of 1/3 in D
19.769 * [backup-simplify]: Simplify 1/3 into 1/3
19.769 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in D
19.769 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in D
19.769 * [taylor]: Taking taylor expansion of (pow d 4) in D
19.769 * [taylor]: Taking taylor expansion of d in D
19.769 * [backup-simplify]: Simplify d into d
19.769 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.769 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.769 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
19.769 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
19.769 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
19.769 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
19.769 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in D
19.769 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in D
19.770 * [taylor]: Taking taylor expansion of (pow M 2) in D
19.770 * [taylor]: Taking taylor expansion of M in D
19.770 * [backup-simplify]: Simplify M into M
19.770 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in D
19.770 * [taylor]: Taking taylor expansion of (pow D 2) in D
19.770 * [taylor]: Taking taylor expansion of D in D
19.770 * [backup-simplify]: Simplify 0 into 0
19.770 * [backup-simplify]: Simplify 1 into 1
19.770 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in D
19.771 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.771 * [taylor]: Taking taylor expansion of (sqrt h) in D
19.771 * [taylor]: Taking taylor expansion of h in D
19.771 * [backup-simplify]: Simplify h into h
19.771 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
19.771 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
19.771 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in M
19.771 * [taylor]: Taking taylor expansion of 1/4 in M
19.771 * [backup-simplify]: Simplify 1/4 into 1/4
19.771 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in M
19.771 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in M
19.771 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in M
19.771 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in M
19.771 * [taylor]: Taking taylor expansion of 1/6 in M
19.771 * [backup-simplify]: Simplify 1/6 into 1/6
19.771 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in M
19.771 * [taylor]: Taking taylor expansion of (/ 1 l) in M
19.771 * [taylor]: Taking taylor expansion of l in M
19.771 * [backup-simplify]: Simplify l into l
19.771 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
19.771 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
19.771 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
19.771 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
19.771 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in M
19.771 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in M
19.772 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in M
19.772 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in M
19.772 * [taylor]: Taking taylor expansion of 1/3 in M
19.772 * [backup-simplify]: Simplify 1/3 into 1/3
19.772 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in M
19.772 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in M
19.772 * [taylor]: Taking taylor expansion of (pow d 4) in M
19.772 * [taylor]: Taking taylor expansion of d in M
19.772 * [backup-simplify]: Simplify d into d
19.772 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.772 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.772 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
19.772 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
19.772 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
19.772 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
19.772 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in M
19.772 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in M
19.772 * [taylor]: Taking taylor expansion of (pow M 2) in M
19.772 * [taylor]: Taking taylor expansion of M in M
19.772 * [backup-simplify]: Simplify 0 into 0
19.772 * [backup-simplify]: Simplify 1 into 1
19.772 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in M
19.772 * [taylor]: Taking taylor expansion of (pow D 2) in M
19.772 * [taylor]: Taking taylor expansion of D in M
19.772 * [backup-simplify]: Simplify D into D
19.772 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in M
19.772 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.772 * [taylor]: Taking taylor expansion of (sqrt h) in M
19.772 * [taylor]: Taking taylor expansion of h in M
19.772 * [backup-simplify]: Simplify h into h
19.772 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
19.772 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
19.772 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in h
19.772 * [taylor]: Taking taylor expansion of 1/4 in h
19.772 * [backup-simplify]: Simplify 1/4 into 1/4
19.772 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in h
19.772 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in h
19.772 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in h
19.772 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in h
19.772 * [taylor]: Taking taylor expansion of 1/6 in h
19.773 * [backup-simplify]: Simplify 1/6 into 1/6
19.773 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in h
19.773 * [taylor]: Taking taylor expansion of (/ 1 l) in h
19.773 * [taylor]: Taking taylor expansion of l in h
19.773 * [backup-simplify]: Simplify l into l
19.773 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
19.773 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
19.773 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
19.773 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
19.773 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in h
19.773 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in h
19.773 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in h
19.773 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in h
19.773 * [taylor]: Taking taylor expansion of 1/3 in h
19.773 * [backup-simplify]: Simplify 1/3 into 1/3
19.773 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in h
19.773 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in h
19.773 * [taylor]: Taking taylor expansion of (pow d 4) in h
19.773 * [taylor]: Taking taylor expansion of d in h
19.773 * [backup-simplify]: Simplify d into d
19.773 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.773 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.773 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
19.773 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
19.773 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
19.773 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
19.773 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in h
19.773 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in h
19.773 * [taylor]: Taking taylor expansion of (pow M 2) in h
19.773 * [taylor]: Taking taylor expansion of M in h
19.773 * [backup-simplify]: Simplify M into M
19.773 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in h
19.773 * [taylor]: Taking taylor expansion of (pow D 2) in h
19.773 * [taylor]: Taking taylor expansion of D in h
19.773 * [backup-simplify]: Simplify D into D
19.773 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in h
19.773 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.774 * [taylor]: Taking taylor expansion of (sqrt h) in h
19.774 * [taylor]: Taking taylor expansion of h in h
19.774 * [backup-simplify]: Simplify 0 into 0
19.774 * [backup-simplify]: Simplify 1 into 1
19.774 * [backup-simplify]: Simplify (sqrt 0) into 0
19.775 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
19.775 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in l
19.775 * [taylor]: Taking taylor expansion of 1/4 in l
19.775 * [backup-simplify]: Simplify 1/4 into 1/4
19.775 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in l
19.775 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in l
19.775 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in l
19.775 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in l
19.775 * [taylor]: Taking taylor expansion of 1/6 in l
19.775 * [backup-simplify]: Simplify 1/6 into 1/6
19.775 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in l
19.775 * [taylor]: Taking taylor expansion of (/ 1 l) in l
19.775 * [taylor]: Taking taylor expansion of l in l
19.775 * [backup-simplify]: Simplify 0 into 0
19.775 * [backup-simplify]: Simplify 1 into 1
19.775 * [backup-simplify]: Simplify (/ 1 1) into 1
19.776 * [backup-simplify]: Simplify (log 1) into 0
19.776 * [backup-simplify]: Simplify (+ (* (- 1) (log l)) 0) into (- (log l))
19.776 * [backup-simplify]: Simplify (* 1/6 (- (log l))) into (* -1/6 (log l))
19.776 * [backup-simplify]: Simplify (exp (* -1/6 (log l))) into (pow l -1/6)
19.776 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in l
19.776 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in l
19.776 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in l
19.776 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in l
19.776 * [taylor]: Taking taylor expansion of 1/3 in l
19.776 * [backup-simplify]: Simplify 1/3 into 1/3
19.776 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in l
19.776 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in l
19.776 * [taylor]: Taking taylor expansion of (pow d 4) in l
19.776 * [taylor]: Taking taylor expansion of d in l
19.776 * [backup-simplify]: Simplify d into d
19.776 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.776 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.776 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
19.776 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
19.777 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
19.777 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
19.777 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in l
19.777 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in l
19.777 * [taylor]: Taking taylor expansion of (pow M 2) in l
19.777 * [taylor]: Taking taylor expansion of M in l
19.777 * [backup-simplify]: Simplify M into M
19.777 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in l
19.777 * [taylor]: Taking taylor expansion of (pow D 2) in l
19.777 * [taylor]: Taking taylor expansion of D in l
19.777 * [backup-simplify]: Simplify D into D
19.777 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in l
19.777 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.777 * [taylor]: Taking taylor expansion of (sqrt h) in l
19.777 * [taylor]: Taking taylor expansion of h in l
19.777 * [backup-simplify]: Simplify h into h
19.777 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
19.777 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
19.777 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in d
19.777 * [taylor]: Taking taylor expansion of 1/4 in d
19.777 * [backup-simplify]: Simplify 1/4 into 1/4
19.777 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in d
19.777 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in d
19.777 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in d
19.777 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in d
19.777 * [taylor]: Taking taylor expansion of 1/6 in d
19.777 * [backup-simplify]: Simplify 1/6 into 1/6
19.777 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in d
19.777 * [taylor]: Taking taylor expansion of (/ 1 l) in d
19.777 * [taylor]: Taking taylor expansion of l in d
19.777 * [backup-simplify]: Simplify l into l
19.777 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
19.777 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
19.777 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
19.777 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
19.777 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in d
19.777 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in d
19.777 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in d
19.777 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in d
19.777 * [taylor]: Taking taylor expansion of 1/3 in d
19.777 * [backup-simplify]: Simplify 1/3 into 1/3
19.778 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in d
19.778 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in d
19.778 * [taylor]: Taking taylor expansion of (pow d 4) in d
19.778 * [taylor]: Taking taylor expansion of d in d
19.778 * [backup-simplify]: Simplify 0 into 0
19.778 * [backup-simplify]: Simplify 1 into 1
19.778 * [backup-simplify]: Simplify (* 1 1) into 1
19.778 * [backup-simplify]: Simplify (* 1 1) into 1
19.778 * [backup-simplify]: Simplify (/ 1 1) into 1
19.779 * [backup-simplify]: Simplify (log 1) into 0
19.779 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
19.779 * [backup-simplify]: Simplify (* 1/3 (- (* 4 (log d)))) into (* -4/3 (log d))
19.779 * [backup-simplify]: Simplify (exp (* -4/3 (log d))) into (pow d -4/3)
19.779 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in d
19.779 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in d
19.779 * [taylor]: Taking taylor expansion of (pow M 2) in d
19.779 * [taylor]: Taking taylor expansion of M in d
19.779 * [backup-simplify]: Simplify M into M
19.779 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in d
19.779 * [taylor]: Taking taylor expansion of (pow D 2) in d
19.779 * [taylor]: Taking taylor expansion of D in d
19.779 * [backup-simplify]: Simplify D into D
19.779 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in d
19.779 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.779 * [taylor]: Taking taylor expansion of (sqrt h) in d
19.779 * [taylor]: Taking taylor expansion of h in d
19.779 * [backup-simplify]: Simplify h into h
19.779 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
19.779 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
19.779 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in d
19.779 * [taylor]: Taking taylor expansion of 1/4 in d
19.779 * [backup-simplify]: Simplify 1/4 into 1/4
19.779 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in d
19.779 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in d
19.779 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in d
19.779 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in d
19.779 * [taylor]: Taking taylor expansion of 1/6 in d
19.779 * [backup-simplify]: Simplify 1/6 into 1/6
19.779 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in d
19.780 * [taylor]: Taking taylor expansion of (/ 1 l) in d
19.780 * [taylor]: Taking taylor expansion of l in d
19.780 * [backup-simplify]: Simplify l into l
19.780 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
19.780 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
19.780 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
19.780 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
19.780 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in d
19.780 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in d
19.780 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in d
19.780 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in d
19.780 * [taylor]: Taking taylor expansion of 1/3 in d
19.780 * [backup-simplify]: Simplify 1/3 into 1/3
19.780 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in d
19.780 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in d
19.780 * [taylor]: Taking taylor expansion of (pow d 4) in d
19.780 * [taylor]: Taking taylor expansion of d in d
19.780 * [backup-simplify]: Simplify 0 into 0
19.780 * [backup-simplify]: Simplify 1 into 1
19.780 * [backup-simplify]: Simplify (* 1 1) into 1
19.780 * [backup-simplify]: Simplify (* 1 1) into 1
19.781 * [backup-simplify]: Simplify (/ 1 1) into 1
19.781 * [backup-simplify]: Simplify (log 1) into 0
19.781 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
19.781 * [backup-simplify]: Simplify (* 1/3 (- (* 4 (log d)))) into (* -4/3 (log d))
19.781 * [backup-simplify]: Simplify (exp (* -4/3 (log d))) into (pow d -4/3)
19.781 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in d
19.781 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in d
19.781 * [taylor]: Taking taylor expansion of (pow M 2) in d
19.781 * [taylor]: Taking taylor expansion of M in d
19.781 * [backup-simplify]: Simplify M into M
19.781 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in d
19.781 * [taylor]: Taking taylor expansion of (pow D 2) in d
19.781 * [taylor]: Taking taylor expansion of D in d
19.781 * [backup-simplify]: Simplify D into D
19.781 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in d
19.782 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.782 * [taylor]: Taking taylor expansion of (sqrt h) in d
19.782 * [taylor]: Taking taylor expansion of h in d
19.782 * [backup-simplify]: Simplify h into h
19.782 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
19.782 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
19.782 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.782 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.782 * [backup-simplify]: Simplify (* (pow D 2) (fabs (pow (/ d l) 1/3))) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
19.782 * [backup-simplify]: Simplify (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
19.782 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) into (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))
19.782 * [backup-simplify]: Simplify (* (pow d -4/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) into (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))
19.783 * [backup-simplify]: Simplify (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))) into (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))
19.783 * [backup-simplify]: Simplify (* 1/4 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (* 1/4 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))
19.783 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))))) in l
19.783 * [taylor]: Taking taylor expansion of 1/4 in l
19.783 * [backup-simplify]: Simplify 1/4 into 1/4
19.783 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))) in l
19.783 * [taylor]: Taking taylor expansion of (sqrt h) in l
19.783 * [taylor]: Taking taylor expansion of h in l
19.783 * [backup-simplify]: Simplify h into h
19.783 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
19.783 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
19.783 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))) in l
19.783 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in l
19.783 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in l
19.783 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in l
19.783 * [taylor]: Taking taylor expansion of 1/3 in l
19.783 * [backup-simplify]: Simplify 1/3 into 1/3
19.783 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in l
19.783 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in l
19.783 * [taylor]: Taking taylor expansion of (pow d 4) in l
19.783 * [taylor]: Taking taylor expansion of d in l
19.783 * [backup-simplify]: Simplify d into d
19.783 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.784 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.784 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
19.784 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
19.784 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
19.784 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
19.784 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)) in l
19.784 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in l
19.784 * [taylor]: Taking taylor expansion of (pow M 2) in l
19.784 * [taylor]: Taking taylor expansion of M in l
19.784 * [backup-simplify]: Simplify M into M
19.784 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in l
19.784 * [taylor]: Taking taylor expansion of (pow D 2) in l
19.784 * [taylor]: Taking taylor expansion of D in l
19.784 * [backup-simplify]: Simplify D into D
19.784 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in l
19.784 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.784 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in l
19.784 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in l
19.784 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in l
19.784 * [taylor]: Taking taylor expansion of 1/6 in l
19.784 * [backup-simplify]: Simplify 1/6 into 1/6
19.784 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in l
19.784 * [taylor]: Taking taylor expansion of (/ 1 l) in l
19.784 * [taylor]: Taking taylor expansion of l in l
19.784 * [backup-simplify]: Simplify 0 into 0
19.784 * [backup-simplify]: Simplify 1 into 1
19.785 * [backup-simplify]: Simplify (/ 1 1) into 1
19.785 * [backup-simplify]: Simplify (log 1) into 0
19.785 * [backup-simplify]: Simplify (+ (* (- 1) (log l)) 0) into (- (log l))
19.785 * [backup-simplify]: Simplify (* 1/6 (- (log l))) into (* -1/6 (log l))
19.785 * [backup-simplify]: Simplify (exp (* -1/6 (log l))) into (pow l -1/6)
19.785 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.785 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.785 * [backup-simplify]: Simplify (* (pow D 2) (fabs (pow (/ d l) 1/3))) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
19.785 * [backup-simplify]: Simplify (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
19.786 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow l -1/6)) into (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))
19.786 * [backup-simplify]: Simplify (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))) into (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))
19.786 * [backup-simplify]: Simplify (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))
19.787 * [backup-simplify]: Simplify (* 1/4 (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))) into (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))))
19.787 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in h
19.787 * [taylor]: Taking taylor expansion of 1/4 in h
19.787 * [backup-simplify]: Simplify 1/4 into 1/4
19.787 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in h
19.787 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in h
19.787 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in h
19.787 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in h
19.787 * [taylor]: Taking taylor expansion of 1/6 in h
19.787 * [backup-simplify]: Simplify 1/6 into 1/6
19.787 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in h
19.787 * [taylor]: Taking taylor expansion of (/ 1 l) in h
19.787 * [taylor]: Taking taylor expansion of l in h
19.787 * [backup-simplify]: Simplify l into l
19.787 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
19.787 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
19.787 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
19.787 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
19.787 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in h
19.787 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in h
19.787 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in h
19.787 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in h
19.787 * [taylor]: Taking taylor expansion of 1/3 in h
19.787 * [backup-simplify]: Simplify 1/3 into 1/3
19.787 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in h
19.787 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in h
19.787 * [taylor]: Taking taylor expansion of (pow d 4) in h
19.787 * [taylor]: Taking taylor expansion of d in h
19.787 * [backup-simplify]: Simplify d into d
19.787 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.787 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.787 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
19.787 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
19.787 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
19.788 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
19.788 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in h
19.788 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in h
19.788 * [taylor]: Taking taylor expansion of (pow M 2) in h
19.788 * [taylor]: Taking taylor expansion of M in h
19.788 * [backup-simplify]: Simplify M into M
19.788 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in h
19.788 * [taylor]: Taking taylor expansion of (pow D 2) in h
19.788 * [taylor]: Taking taylor expansion of D in h
19.788 * [backup-simplify]: Simplify D into D
19.788 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in h
19.788 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.788 * [taylor]: Taking taylor expansion of (sqrt h) in h
19.788 * [taylor]: Taking taylor expansion of h in h
19.788 * [backup-simplify]: Simplify 0 into 0
19.788 * [backup-simplify]: Simplify 1 into 1
19.788 * [backup-simplify]: Simplify (sqrt 0) into 0
19.789 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
19.789 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.789 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.789 * [backup-simplify]: Simplify (* (pow D 2) (fabs (pow (/ d l) 1/3))) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
19.789 * [backup-simplify]: Simplify (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
19.790 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) into 0
19.790 * [backup-simplify]: Simplify (* (pow (/ 1 (pow d 4)) 1/3) 0) into 0
19.790 * [backup-simplify]: Simplify (* (pow (/ 1 l) 1/6) 0) into 0
19.790 * [backup-simplify]: Simplify (* 1/4 0) into 0
19.790 * [taylor]: Taking taylor expansion of 0 in M
19.790 * [backup-simplify]: Simplify 0 into 0
19.790 * [taylor]: Taking taylor expansion of 0 in D
19.790 * [backup-simplify]: Simplify 0 into 0
19.790 * [backup-simplify]: Simplify 0 into 0
19.790 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
19.790 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (fabs (pow (/ d l) 1/3)))) into 0
19.790 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
19.790 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3))))) into 0
19.791 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (sqrt h))) into 0
19.791 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.791 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.792 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
19.793 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
19.793 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
19.793 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (- (* 4 (log d))))) into 0
19.794 * [backup-simplify]: Simplify (* (exp (* -4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
19.794 * [backup-simplify]: Simplify (+ (* (pow d -4/3) 0) (* 0 (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) into 0
19.794 * [backup-simplify]: Simplify (- (+ (* (/ 1 l) (/ 0 l)))) into 0
19.795 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 l) 1)))) 1) into 0
19.795 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (/ 1 l)))) into 0
19.795 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 l)))) (+ (* (/ (pow 0 1) 1)))) into 0
19.796 * [backup-simplify]: Simplify (+ (* (pow (/ 1 l) 1/6) 0) (* 0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))) into 0
19.796 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))) into 0
19.796 * [taylor]: Taking taylor expansion of 0 in l
19.796 * [backup-simplify]: Simplify 0 into 0
19.796 * [taylor]: Taking taylor expansion of 0 in h
19.797 * [backup-simplify]: Simplify 0 into 0
19.797 * [taylor]: Taking taylor expansion of 0 in M
19.797 * [backup-simplify]: Simplify 0 into 0
19.797 * [taylor]: Taking taylor expansion of 0 in D
19.797 * [backup-simplify]: Simplify 0 into 0
19.797 * [backup-simplify]: Simplify 0 into 0
19.797 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
19.798 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
19.798 * [backup-simplify]: Simplify (+ (* (- 1) (log l)) 0) into (- (log l))
19.798 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (- (log l)))) into 0
19.799 * [backup-simplify]: Simplify (* (exp (* -1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
19.799 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
19.799 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (fabs (pow (/ d l) 1/3)))) into 0
19.799 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
19.799 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3))))) into 0
19.799 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (pow l -1/6))) into 0
19.800 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
19.800 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
19.800 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))))) into 0
19.801 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 1) into 0
19.801 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (/ 1 (pow d 4))))) into 0
19.802 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 1) 1)))) into 0
19.803 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow d 4)) 1/3) 0) (* 0 (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))) into 0
19.803 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (* 0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into 0
19.804 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))))) into 0
19.804 * [taylor]: Taking taylor expansion of 0 in h
19.804 * [backup-simplify]: Simplify 0 into 0
19.804 * [taylor]: Taking taylor expansion of 0 in M
19.804 * [backup-simplify]: Simplify 0 into 0
19.804 * [taylor]: Taking taylor expansion of 0 in D
19.805 * [backup-simplify]: Simplify 0 into 0
19.805 * [backup-simplify]: Simplify 0 into 0
19.805 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
19.805 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (fabs (pow (/ d l) 1/3)))) into 0
19.805 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
19.805 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3))))) into 0
19.806 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) +nan.0) (* 0 0)) into (- (* +nan.0 (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))
19.806 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
19.806 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
19.807 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))))) into 0
19.807 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 1) into 0
19.808 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (/ 1 (pow d 4))))) into 0
19.809 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 1) 1)))) into 0
19.810 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow d 4)) 1/3) (- (* +nan.0 (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (* 0 0)) into (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow (/ 1 (pow d 4)) 1/3))))
19.810 * [backup-simplify]: Simplify (- (+ (* (/ 1 l) (/ 0 l)))) into 0
19.811 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 l) 1)))) 1) into 0
19.812 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (/ 1 l)))) into 0
19.813 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 l)))) (+ (* (/ (pow 0 1) 1)))) into 0
19.814 * [backup-simplify]: Simplify (+ (* (pow (/ 1 l) 1/6) (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow (/ 1 (pow d 4)) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))
19.815 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))) (* 0 0)) into (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
19.815 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in M
19.816 * [taylor]: Taking taylor expansion of (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in M
19.816 * [taylor]: Taking taylor expansion of +nan.0 in M
19.816 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.816 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in M
19.816 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in M
19.816 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in M
19.816 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.816 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
19.816 * [taylor]: Taking taylor expansion of (pow M 2) in M
19.816 * [taylor]: Taking taylor expansion of M in M
19.816 * [backup-simplify]: Simplify 0 into 0
19.816 * [backup-simplify]: Simplify 1 into 1
19.816 * [taylor]: Taking taylor expansion of (pow D 2) in M
19.816 * [taylor]: Taking taylor expansion of D in M
19.816 * [backup-simplify]: Simplify D into D
19.816 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in M
19.816 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in M
19.816 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in M
19.816 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in M
19.816 * [taylor]: Taking taylor expansion of 1/6 in M
19.816 * [backup-simplify]: Simplify 1/6 into 1/6
19.816 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in M
19.816 * [taylor]: Taking taylor expansion of (/ 1 l) in M
19.816 * [taylor]: Taking taylor expansion of l in M
19.816 * [backup-simplify]: Simplify l into l
19.816 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
19.816 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
19.817 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
19.817 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
19.817 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in M
19.817 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in M
19.817 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in M
19.817 * [taylor]: Taking taylor expansion of 1/3 in M
19.817 * [backup-simplify]: Simplify 1/3 into 1/3
19.817 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in M
19.817 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in M
19.817 * [taylor]: Taking taylor expansion of (pow d 4) in M
19.817 * [taylor]: Taking taylor expansion of d in M
19.817 * [backup-simplify]: Simplify d into d
19.817 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.817 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.817 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
19.817 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
19.817 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
19.817 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
19.818 * [backup-simplify]: Simplify (* 1 1) into 1
19.818 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.818 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
19.818 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (pow D 2)) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
19.818 * [backup-simplify]: Simplify (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)) into (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))
19.819 * [backup-simplify]: Simplify (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)))
19.819 * [backup-simplify]: Simplify (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)))) into (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6))))
19.820 * [backup-simplify]: Simplify (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6))))) into (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)))))
19.820 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6))))) in D
19.820 * [taylor]: Taking taylor expansion of (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)))) in D
19.820 * [taylor]: Taking taylor expansion of +nan.0 in D
19.820 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.820 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6))) in D
19.820 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in D
19.820 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in D
19.820 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in D
19.820 * [taylor]: Taking taylor expansion of 1/3 in D
19.820 * [backup-simplify]: Simplify 1/3 into 1/3
19.820 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in D
19.820 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in D
19.820 * [taylor]: Taking taylor expansion of (pow d 4) in D
19.820 * [taylor]: Taking taylor expansion of d in D
19.820 * [backup-simplify]: Simplify d into d
19.820 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.821 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.821 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
19.821 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
19.821 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
19.821 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
19.821 * [taylor]: Taking taylor expansion of (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)) in D
19.821 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in D
19.821 * [taylor]: Taking taylor expansion of (pow D 2) in D
19.821 * [taylor]: Taking taylor expansion of D in D
19.821 * [backup-simplify]: Simplify 0 into 0
19.821 * [backup-simplify]: Simplify 1 into 1
19.821 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in D
19.821 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
19.821 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in D
19.821 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in D
19.821 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in D
19.821 * [taylor]: Taking taylor expansion of 1/6 in D
19.821 * [backup-simplify]: Simplify 1/6 into 1/6
19.821 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in D
19.821 * [taylor]: Taking taylor expansion of (/ 1 l) in D
19.821 * [taylor]: Taking taylor expansion of l in D
19.821 * [backup-simplify]: Simplify l into l
19.822 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
19.822 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
19.822 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
19.822 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
19.828 * [backup-simplify]: Simplify (* 1 1) into 1
19.828 * [backup-simplify]: Simplify (* 1 (fabs (pow (/ d l) 1/3))) into (fabs (pow (/ d l) 1/3))
19.828 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (pow (/ 1 l) 1/6)) into (* (pow (/ 1 l) 1/6) (fabs (pow (/ d l) 1/3)))
19.829 * [backup-simplify]: Simplify (* (pow (/ 1 (pow d 4)) 1/3) (* (pow (/ 1 l) 1/6) (fabs (pow (/ d l) 1/3)))) into (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))
19.829 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))
19.830 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
19.830 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
19.830 * [taylor]: Taking taylor expansion of 0 in D
19.830 * [backup-simplify]: Simplify 0 into 0
19.830 * [backup-simplify]: Simplify 0 into 0
19.830 * [backup-simplify]: Simplify 0 into 0
19.832 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt h))) into 0
19.832 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
19.833 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (fabs (pow (/ d l) 1/3))))) into 0
19.833 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
19.834 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3)))))) into 0
19.834 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (+ (* 0 0) (* 0 (sqrt h)))) into 0
19.835 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.836 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.837 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.840 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
19.841 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
19.842 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (- (* 4 (log d)))))) into 0
19.843 * [backup-simplify]: Simplify (* (exp (* -4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.844 * [backup-simplify]: Simplify (+ (* (pow d -4/3) 0) (+ (* 0 0) (* 0 (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) into 0
19.844 * [backup-simplify]: Simplify (- (+ (* (/ 1 l) (/ 0 l)) (* 0 (/ 0 l)))) into 0
19.846 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (/ 1 l) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (/ 1 l) 1)))) 2) into 0
19.847 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (/ 1 l))))) into 0
19.848 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 l)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.849 * [backup-simplify]: Simplify (+ (* (pow (/ 1 l) 1/6) 0) (+ (* 0 0) (* 0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))))) into 0
19.851 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))))) into 0
19.851 * [taylor]: Taking taylor expansion of 0 in l
19.851 * [backup-simplify]: Simplify 0 into 0
19.851 * [taylor]: Taking taylor expansion of 0 in h
19.851 * [backup-simplify]: Simplify 0 into 0
19.851 * [taylor]: Taking taylor expansion of 0 in M
19.851 * [backup-simplify]: Simplify 0 into 0
19.851 * [taylor]: Taking taylor expansion of 0 in D
19.851 * [backup-simplify]: Simplify 0 into 0
19.851 * [backup-simplify]: Simplify 0 into 0
19.851 * [taylor]: Taking taylor expansion of 0 in h
19.851 * [backup-simplify]: Simplify 0 into 0
19.851 * [taylor]: Taking taylor expansion of 0 in M
19.851 * [backup-simplify]: Simplify 0 into 0
19.851 * [taylor]: Taking taylor expansion of 0 in D
19.851 * [backup-simplify]: Simplify 0 into 0
19.851 * [backup-simplify]: Simplify 0 into 0
19.852 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
19.855 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
19.856 * [backup-simplify]: Simplify (+ (* (- 1) (log l)) 0) into (- (log l))
19.856 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (- (log l))))) into 0
19.858 * [backup-simplify]: Simplify (* (exp (* -1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.858 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
19.859 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (fabs (pow (/ d l) 1/3))))) into 0
19.859 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
19.860 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3)))))) into 0
19.861 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (+ (* 0 0) (* 0 (pow l -1/6)))) into 0
19.861 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
19.862 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
19.862 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))) (* 0 (/ 0 (pow d 4))))) into 0
19.863 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (/ 1 (pow d 4)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 2) into 0
19.864 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (/ 1 (pow d 4)))))) into 0
19.866 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.867 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow d 4)) 1/3) 0) (+ (* 0 0) (* 0 (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))))) into 0
19.867 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt h))) into 0
19.868 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (+ (* 0 0) (* 0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))) into 0
19.870 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))))) into 0
19.870 * [taylor]: Taking taylor expansion of 0 in h
19.870 * [backup-simplify]: Simplify 0 into 0
19.870 * [taylor]: Taking taylor expansion of 0 in M
19.870 * [backup-simplify]: Simplify 0 into 0
19.870 * [taylor]: Taking taylor expansion of 0 in D
19.870 * [backup-simplify]: Simplify 0 into 0
19.870 * [backup-simplify]: Simplify 0 into 0
19.870 * [taylor]: Taking taylor expansion of 0 in M
19.870 * [backup-simplify]: Simplify 0 into 0
19.870 * [taylor]: Taking taylor expansion of 0 in D
19.870 * [backup-simplify]: Simplify 0 into 0
19.870 * [backup-simplify]: Simplify 0 into 0
19.871 * [backup-simplify]: Simplify (* (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) (* (pow D 2) (* (pow M 2) (* h (* 1 1))))) into (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 l) 1/6))))
19.872 * [backup-simplify]: Simplify (* (* (* (fabs (/ (cbrt (/ 1 d)) (cbrt (/ 1 l)))) (sqrt (/ (cbrt (/ 1 d)) (cbrt (/ 1 l))))) (sqrt (/ (/ 1 d) (/ 1 h)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (/ 1 h)))) into (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
19.873 * [approximate]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in (d l h M D) around 0
19.873 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in D
19.873 * [taylor]: Taking taylor expansion of 1/4 in D
19.873 * [backup-simplify]: Simplify 1/4 into 1/4
19.873 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in D
19.873 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in D
19.873 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
19.873 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.873 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in D
19.873 * [taylor]: Taking taylor expansion of (pow D 2) in D
19.873 * [taylor]: Taking taylor expansion of D in D
19.873 * [backup-simplify]: Simplify 0 into 0
19.873 * [backup-simplify]: Simplify 1 into 1
19.873 * [taylor]: Taking taylor expansion of (pow M 2) in D
19.873 * [taylor]: Taking taylor expansion of M in D
19.873 * [backup-simplify]: Simplify M into M
19.874 * [backup-simplify]: Simplify (* 1 1) into 1
19.874 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.874 * [backup-simplify]: Simplify (* 1 (pow M 2)) into (pow M 2)
19.874 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow M 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow M 2))
19.874 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in D
19.874 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
19.874 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
19.874 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
19.874 * [taylor]: Taking taylor expansion of 1/6 in D
19.874 * [backup-simplify]: Simplify 1/6 into 1/6
19.874 * [taylor]: Taking taylor expansion of (log l) in D
19.874 * [taylor]: Taking taylor expansion of l in D
19.874 * [backup-simplify]: Simplify l into l
19.874 * [backup-simplify]: Simplify (log l) into (log l)
19.874 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.874 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.874 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in D
19.874 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in D
19.874 * [taylor]: Taking taylor expansion of (/ 1 h) in D
19.874 * [taylor]: Taking taylor expansion of h in D
19.874 * [backup-simplify]: Simplify h into h
19.874 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.875 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
19.875 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
19.875 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
19.875 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
19.875 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
19.875 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
19.875 * [taylor]: Taking taylor expansion of 1/3 in D
19.875 * [backup-simplify]: Simplify 1/3 into 1/3
19.875 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
19.875 * [taylor]: Taking taylor expansion of (pow d 4) in D
19.875 * [taylor]: Taking taylor expansion of d in D
19.875 * [backup-simplify]: Simplify d into d
19.875 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.875 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.875 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.875 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.875 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.876 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in M
19.876 * [taylor]: Taking taylor expansion of 1/4 in M
19.876 * [backup-simplify]: Simplify 1/4 into 1/4
19.876 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in M
19.876 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
19.876 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
19.876 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.876 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
19.876 * [taylor]: Taking taylor expansion of (pow D 2) in M
19.876 * [taylor]: Taking taylor expansion of D in M
19.876 * [backup-simplify]: Simplify D into D
19.876 * [taylor]: Taking taylor expansion of (pow M 2) in M
19.876 * [taylor]: Taking taylor expansion of M in M
19.876 * [backup-simplify]: Simplify 0 into 0
19.876 * [backup-simplify]: Simplify 1 into 1
19.876 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.876 * [backup-simplify]: Simplify (* 1 1) into 1
19.877 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
19.877 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
19.877 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in M
19.877 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
19.877 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
19.877 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
19.877 * [taylor]: Taking taylor expansion of 1/6 in M
19.877 * [backup-simplify]: Simplify 1/6 into 1/6
19.877 * [taylor]: Taking taylor expansion of (log l) in M
19.877 * [taylor]: Taking taylor expansion of l in M
19.877 * [backup-simplify]: Simplify l into l
19.877 * [backup-simplify]: Simplify (log l) into (log l)
19.877 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.877 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.877 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in M
19.877 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in M
19.877 * [taylor]: Taking taylor expansion of (/ 1 h) in M
19.877 * [taylor]: Taking taylor expansion of h in M
19.877 * [backup-simplify]: Simplify h into h
19.877 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.877 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
19.878 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
19.878 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
19.878 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
19.878 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
19.878 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
19.878 * [taylor]: Taking taylor expansion of 1/3 in M
19.878 * [backup-simplify]: Simplify 1/3 into 1/3
19.878 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
19.878 * [taylor]: Taking taylor expansion of (pow d 4) in M
19.878 * [taylor]: Taking taylor expansion of d in M
19.878 * [backup-simplify]: Simplify d into d
19.878 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.878 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.878 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.878 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.878 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.878 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in h
19.878 * [taylor]: Taking taylor expansion of 1/4 in h
19.878 * [backup-simplify]: Simplify 1/4 into 1/4
19.878 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in h
19.879 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
19.879 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
19.879 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.879 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
19.879 * [taylor]: Taking taylor expansion of (pow D 2) in h
19.879 * [taylor]: Taking taylor expansion of D in h
19.879 * [backup-simplify]: Simplify D into D
19.879 * [taylor]: Taking taylor expansion of (pow M 2) in h
19.879 * [taylor]: Taking taylor expansion of M in h
19.879 * [backup-simplify]: Simplify M into M
19.879 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.879 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.879 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
19.879 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
19.879 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in h
19.879 * [taylor]: Taking taylor expansion of (pow l 1/6) in h
19.879 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in h
19.879 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in h
19.879 * [taylor]: Taking taylor expansion of 1/6 in h
19.880 * [backup-simplify]: Simplify 1/6 into 1/6
19.880 * [taylor]: Taking taylor expansion of (log l) in h
19.880 * [taylor]: Taking taylor expansion of l in h
19.880 * [backup-simplify]: Simplify l into l
19.880 * [backup-simplify]: Simplify (log l) into (log l)
19.880 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.880 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.880 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in h
19.880 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
19.880 * [taylor]: Taking taylor expansion of (/ 1 h) in h
19.880 * [taylor]: Taking taylor expansion of h in h
19.880 * [backup-simplify]: Simplify 0 into 0
19.880 * [backup-simplify]: Simplify 1 into 1
19.880 * [backup-simplify]: Simplify (/ 1 1) into 1
19.881 * [backup-simplify]: Simplify (sqrt 0) into 0
19.882 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
19.882 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
19.882 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
19.882 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
19.882 * [taylor]: Taking taylor expansion of 1/3 in h
19.882 * [backup-simplify]: Simplify 1/3 into 1/3
19.882 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
19.882 * [taylor]: Taking taylor expansion of (pow d 4) in h
19.882 * [taylor]: Taking taylor expansion of d in h
19.883 * [backup-simplify]: Simplify d into d
19.883 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.883 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.883 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.883 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.883 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.883 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in l
19.883 * [taylor]: Taking taylor expansion of 1/4 in l
19.883 * [backup-simplify]: Simplify 1/4 into 1/4
19.883 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in l
19.883 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
19.883 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
19.883 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.883 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
19.883 * [taylor]: Taking taylor expansion of (pow D 2) in l
19.883 * [taylor]: Taking taylor expansion of D in l
19.883 * [backup-simplify]: Simplify D into D
19.883 * [taylor]: Taking taylor expansion of (pow M 2) in l
19.883 * [taylor]: Taking taylor expansion of M in l
19.883 * [backup-simplify]: Simplify M into M
19.884 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.884 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.884 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
19.884 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
19.884 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in l
19.884 * [taylor]: Taking taylor expansion of (pow l 1/6) in l
19.884 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in l
19.884 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in l
19.884 * [taylor]: Taking taylor expansion of 1/6 in l
19.884 * [backup-simplify]: Simplify 1/6 into 1/6
19.884 * [taylor]: Taking taylor expansion of (log l) in l
19.884 * [taylor]: Taking taylor expansion of l in l
19.884 * [backup-simplify]: Simplify 0 into 0
19.884 * [backup-simplify]: Simplify 1 into 1
19.885 * [backup-simplify]: Simplify (log 1) into 0
19.885 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
19.885 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.885 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.885 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in l
19.885 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
19.885 * [taylor]: Taking taylor expansion of (/ 1 h) in l
19.885 * [taylor]: Taking taylor expansion of h in l
19.885 * [backup-simplify]: Simplify h into h
19.885 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.885 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
19.886 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
19.886 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
19.886 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
19.886 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
19.886 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
19.886 * [taylor]: Taking taylor expansion of 1/3 in l
19.886 * [backup-simplify]: Simplify 1/3 into 1/3
19.886 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
19.886 * [taylor]: Taking taylor expansion of (pow d 4) in l
19.886 * [taylor]: Taking taylor expansion of d in l
19.886 * [backup-simplify]: Simplify d into d
19.886 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.886 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.886 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.886 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.886 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.886 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in d
19.886 * [taylor]: Taking taylor expansion of 1/4 in d
19.886 * [backup-simplify]: Simplify 1/4 into 1/4
19.887 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in d
19.887 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
19.887 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
19.887 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.887 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
19.887 * [taylor]: Taking taylor expansion of (pow D 2) in d
19.887 * [taylor]: Taking taylor expansion of D in d
19.887 * [backup-simplify]: Simplify D into D
19.887 * [taylor]: Taking taylor expansion of (pow M 2) in d
19.887 * [taylor]: Taking taylor expansion of M in d
19.887 * [backup-simplify]: Simplify M into M
19.887 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.887 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.887 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
19.887 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
19.887 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in d
19.887 * [taylor]: Taking taylor expansion of (pow l 1/6) in d
19.887 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in d
19.887 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in d
19.887 * [taylor]: Taking taylor expansion of 1/6 in d
19.887 * [backup-simplify]: Simplify 1/6 into 1/6
19.888 * [taylor]: Taking taylor expansion of (log l) in d
19.888 * [taylor]: Taking taylor expansion of l in d
19.888 * [backup-simplify]: Simplify l into l
19.888 * [backup-simplify]: Simplify (log l) into (log l)
19.888 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.888 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.888 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in d
19.888 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
19.888 * [taylor]: Taking taylor expansion of (/ 1 h) in d
19.888 * [taylor]: Taking taylor expansion of h in d
19.888 * [backup-simplify]: Simplify h into h
19.888 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.888 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
19.888 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
19.888 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
19.888 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
19.888 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
19.888 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
19.888 * [taylor]: Taking taylor expansion of 1/3 in d
19.888 * [backup-simplify]: Simplify 1/3 into 1/3
19.888 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
19.888 * [taylor]: Taking taylor expansion of (pow d 4) in d
19.888 * [taylor]: Taking taylor expansion of d in d
19.888 * [backup-simplify]: Simplify 0 into 0
19.888 * [backup-simplify]: Simplify 1 into 1
19.889 * [backup-simplify]: Simplify (* 1 1) into 1
19.889 * [backup-simplify]: Simplify (* 1 1) into 1
19.890 * [backup-simplify]: Simplify (log 1) into 0
19.890 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
19.890 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
19.890 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
19.890 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in d
19.890 * [taylor]: Taking taylor expansion of 1/4 in d
19.890 * [backup-simplify]: Simplify 1/4 into 1/4
19.890 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in d
19.891 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
19.891 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
19.891 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.891 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
19.891 * [taylor]: Taking taylor expansion of (pow D 2) in d
19.891 * [taylor]: Taking taylor expansion of D in d
19.891 * [backup-simplify]: Simplify D into D
19.891 * [taylor]: Taking taylor expansion of (pow M 2) in d
19.891 * [taylor]: Taking taylor expansion of M in d
19.891 * [backup-simplify]: Simplify M into M
19.891 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.891 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.891 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
19.892 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
19.892 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in d
19.892 * [taylor]: Taking taylor expansion of (pow l 1/6) in d
19.892 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in d
19.892 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in d
19.892 * [taylor]: Taking taylor expansion of 1/6 in d
19.892 * [backup-simplify]: Simplify 1/6 into 1/6
19.892 * [taylor]: Taking taylor expansion of (log l) in d
19.892 * [taylor]: Taking taylor expansion of l in d
19.892 * [backup-simplify]: Simplify l into l
19.892 * [backup-simplify]: Simplify (log l) into (log l)
19.892 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.892 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.892 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in d
19.892 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
19.892 * [taylor]: Taking taylor expansion of (/ 1 h) in d
19.892 * [taylor]: Taking taylor expansion of h in d
19.892 * [backup-simplify]: Simplify h into h
19.892 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.892 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
19.892 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
19.892 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
19.892 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
19.893 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
19.893 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
19.893 * [taylor]: Taking taylor expansion of 1/3 in d
19.893 * [backup-simplify]: Simplify 1/3 into 1/3
19.893 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
19.893 * [taylor]: Taking taylor expansion of (pow d 4) in d
19.893 * [taylor]: Taking taylor expansion of d in d
19.893 * [backup-simplify]: Simplify 0 into 0
19.893 * [backup-simplify]: Simplify 1 into 1
19.893 * [backup-simplify]: Simplify (* 1 1) into 1
19.894 * [backup-simplify]: Simplify (* 1 1) into 1
19.894 * [backup-simplify]: Simplify (log 1) into 0
19.894 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
19.894 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
19.895 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
19.895 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (pow d 4/3)) into (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))
19.895 * [backup-simplify]: Simplify (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) into (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
19.896 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
19.896 * [backup-simplify]: Simplify (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
19.896 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in l
19.896 * [taylor]: Taking taylor expansion of 1/4 in l
19.896 * [backup-simplify]: Simplify 1/4 into 1/4
19.896 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in l
19.896 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
19.896 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
19.896 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.896 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
19.896 * [taylor]: Taking taylor expansion of (pow D 2) in l
19.897 * [taylor]: Taking taylor expansion of D in l
19.897 * [backup-simplify]: Simplify D into D
19.897 * [taylor]: Taking taylor expansion of (pow M 2) in l
19.897 * [taylor]: Taking taylor expansion of M in l
19.897 * [backup-simplify]: Simplify M into M
19.897 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.897 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.897 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
19.897 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
19.897 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in l
19.897 * [taylor]: Taking taylor expansion of (pow l 1/6) in l
19.897 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in l
19.897 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in l
19.897 * [taylor]: Taking taylor expansion of 1/6 in l
19.897 * [backup-simplify]: Simplify 1/6 into 1/6
19.897 * [taylor]: Taking taylor expansion of (log l) in l
19.897 * [taylor]: Taking taylor expansion of l in l
19.897 * [backup-simplify]: Simplify 0 into 0
19.897 * [backup-simplify]: Simplify 1 into 1
19.898 * [backup-simplify]: Simplify (log 1) into 0
19.898 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
19.898 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.899 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.899 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in l
19.899 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
19.899 * [taylor]: Taking taylor expansion of (/ 1 h) in l
19.899 * [taylor]: Taking taylor expansion of h in l
19.899 * [backup-simplify]: Simplify h into h
19.899 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
19.899 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
19.899 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
19.899 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
19.899 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
19.899 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
19.899 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
19.899 * [taylor]: Taking taylor expansion of 1/3 in l
19.899 * [backup-simplify]: Simplify 1/3 into 1/3
19.899 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
19.899 * [taylor]: Taking taylor expansion of (pow d 4) in l
19.899 * [taylor]: Taking taylor expansion of d in l
19.899 * [backup-simplify]: Simplify d into d
19.899 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.899 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.899 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.900 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.900 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.900 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) into (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))
19.900 * [backup-simplify]: Simplify (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) into (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
19.901 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
19.901 * [backup-simplify]: Simplify (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
19.901 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in h
19.901 * [taylor]: Taking taylor expansion of 1/4 in h
19.901 * [backup-simplify]: Simplify 1/4 into 1/4
19.901 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in h
19.901 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
19.901 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
19.901 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.901 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
19.901 * [taylor]: Taking taylor expansion of (pow D 2) in h
19.902 * [taylor]: Taking taylor expansion of D in h
19.902 * [backup-simplify]: Simplify D into D
19.902 * [taylor]: Taking taylor expansion of (pow M 2) in h
19.902 * [taylor]: Taking taylor expansion of M in h
19.902 * [backup-simplify]: Simplify M into M
19.902 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.902 * [backup-simplify]: Simplify (* M M) into (pow M 2)
19.902 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
19.902 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
19.902 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in h
19.902 * [taylor]: Taking taylor expansion of (pow l 1/6) in h
19.902 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in h
19.902 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in h
19.902 * [taylor]: Taking taylor expansion of 1/6 in h
19.902 * [backup-simplify]: Simplify 1/6 into 1/6
19.902 * [taylor]: Taking taylor expansion of (log l) in h
19.902 * [taylor]: Taking taylor expansion of l in h
19.902 * [backup-simplify]: Simplify l into l
19.902 * [backup-simplify]: Simplify (log l) into (log l)
19.902 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.903 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.903 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in h
19.903 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
19.903 * [taylor]: Taking taylor expansion of (/ 1 h) in h
19.903 * [taylor]: Taking taylor expansion of h in h
19.903 * [backup-simplify]: Simplify 0 into 0
19.903 * [backup-simplify]: Simplify 1 into 1
19.903 * [backup-simplify]: Simplify (/ 1 1) into 1
19.904 * [backup-simplify]: Simplify (sqrt 0) into 0
19.905 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
19.905 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
19.905 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
19.905 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
19.905 * [taylor]: Taking taylor expansion of 1/3 in h
19.905 * [backup-simplify]: Simplify 1/3 into 1/3
19.905 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
19.905 * [taylor]: Taking taylor expansion of (pow d 4) in h
19.905 * [taylor]: Taking taylor expansion of d in h
19.905 * [backup-simplify]: Simplify d into d
19.905 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.905 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.905 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.906 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.906 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.906 * [backup-simplify]: Simplify (* 0 (pow (pow d 4) 1/3)) into 0
19.906 * [backup-simplify]: Simplify (* (pow l 1/6) 0) into 0
19.906 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) into 0
19.907 * [backup-simplify]: Simplify (* 1/4 0) into 0
19.907 * [taylor]: Taking taylor expansion of 0 in M
19.907 * [backup-simplify]: Simplify 0 into 0
19.907 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.908 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.909 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
19.910 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
19.910 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (* 4 (log d)))) into 0
19.911 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
19.911 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (pow d 4/3))) into 0
19.912 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
19.912 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
19.913 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
19.913 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into 0
19.914 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
19.914 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
19.914 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
19.914 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
19.915 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
19.916 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
19.916 * [taylor]: Taking taylor expansion of 0 in l
19.916 * [backup-simplify]: Simplify 0 into 0
19.916 * [taylor]: Taking taylor expansion of 0 in h
19.916 * [backup-simplify]: Simplify 0 into 0
19.916 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
19.916 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
19.917 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
19.918 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
19.918 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
19.919 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (pow (pow d 4) 1/3))) into 0
19.920 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
19.921 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
19.921 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
19.922 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
19.922 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into 0
19.922 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
19.922 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
19.922 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
19.923 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
19.923 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
19.925 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
19.925 * [taylor]: Taking taylor expansion of 0 in h
19.925 * [backup-simplify]: Simplify 0 into 0
19.925 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
19.925 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
19.926 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
19.926 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
19.927 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
19.928 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (pow (pow d 4) 1/3))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
19.929 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
19.929 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
19.930 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
19.931 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0)) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
19.931 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
19.931 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
19.931 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
19.931 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
19.933 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.934 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.934 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
19.934 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
19.934 * [taylor]: Taking taylor expansion of +nan.0 in M
19.934 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.934 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
19.934 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
19.934 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
19.935 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.935 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
19.935 * [taylor]: Taking taylor expansion of (pow D 2) in M
19.935 * [taylor]: Taking taylor expansion of D in M
19.935 * [backup-simplify]: Simplify D into D
19.935 * [taylor]: Taking taylor expansion of (pow M 2) in M
19.935 * [taylor]: Taking taylor expansion of M in M
19.935 * [backup-simplify]: Simplify 0 into 0
19.935 * [backup-simplify]: Simplify 1 into 1
19.935 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.935 * [backup-simplify]: Simplify (* 1 1) into 1
19.935 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
19.936 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
19.936 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
19.936 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
19.936 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
19.936 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
19.936 * [taylor]: Taking taylor expansion of 1/6 in M
19.936 * [backup-simplify]: Simplify 1/6 into 1/6
19.936 * [taylor]: Taking taylor expansion of (log l) in M
19.936 * [taylor]: Taking taylor expansion of l in M
19.936 * [backup-simplify]: Simplify l into l
19.936 * [backup-simplify]: Simplify (log l) into (log l)
19.936 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.936 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.936 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
19.936 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
19.936 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
19.936 * [taylor]: Taking taylor expansion of 1/3 in M
19.936 * [backup-simplify]: Simplify 1/3 into 1/3
19.936 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
19.936 * [taylor]: Taking taylor expansion of (pow d 4) in M
19.936 * [taylor]: Taking taylor expansion of d in M
19.936 * [backup-simplify]: Simplify d into d
19.936 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.936 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.937 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.937 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.937 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.937 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
19.937 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
19.938 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
19.938 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.938 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
19.938 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
19.938 * [taylor]: Taking taylor expansion of +nan.0 in D
19.938 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.938 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
19.938 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
19.938 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
19.939 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.939 * [taylor]: Taking taylor expansion of (pow D 2) in D
19.939 * [taylor]: Taking taylor expansion of D in D
19.939 * [backup-simplify]: Simplify 0 into 0
19.939 * [backup-simplify]: Simplify 1 into 1
19.939 * [backup-simplify]: Simplify (* 1 1) into 1
19.939 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
19.939 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
19.939 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
19.939 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
19.939 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
19.939 * [taylor]: Taking taylor expansion of 1/6 in D
19.939 * [backup-simplify]: Simplify 1/6 into 1/6
19.940 * [taylor]: Taking taylor expansion of (log l) in D
19.940 * [taylor]: Taking taylor expansion of l in D
19.940 * [backup-simplify]: Simplify l into l
19.940 * [backup-simplify]: Simplify (log l) into (log l)
19.940 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.940 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.940 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
19.940 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
19.940 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
19.940 * [taylor]: Taking taylor expansion of 1/3 in D
19.940 * [backup-simplify]: Simplify 1/3 into 1/3
19.940 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
19.940 * [taylor]: Taking taylor expansion of (pow d 4) in D
19.940 * [taylor]: Taking taylor expansion of d in D
19.940 * [backup-simplify]: Simplify d into d
19.940 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.940 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.940 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.940 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.940 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.940 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
19.940 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
19.941 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
19.941 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.941 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.942 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.942 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
19.944 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
19.944 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
19.944 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (* 4 (log d))))) into 0
19.945 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.945 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
19.946 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
19.946 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (pow d 4/3)))) into 0
19.947 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow l 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow l 1)))) 2) into 0
19.948 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
19.948 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.949 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
19.949 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
19.949 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
19.950 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
19.950 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
19.951 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
19.951 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
19.951 * [taylor]: Taking taylor expansion of 0 in l
19.951 * [backup-simplify]: Simplify 0 into 0
19.951 * [taylor]: Taking taylor expansion of 0 in h
19.951 * [backup-simplify]: Simplify 0 into 0
19.952 * [taylor]: Taking taylor expansion of 0 in h
19.952 * [backup-simplify]: Simplify 0 into 0
19.952 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
19.952 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
19.953 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
19.954 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
19.954 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.955 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
19.955 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
19.955 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
19.957 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
19.957 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
19.958 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
19.958 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.959 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
19.959 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
19.959 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
19.960 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
19.960 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
19.960 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
19.961 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
19.961 * [taylor]: Taking taylor expansion of 0 in h
19.961 * [backup-simplify]: Simplify 0 into 0
19.961 * [taylor]: Taking taylor expansion of 0 in M
19.961 * [backup-simplify]: Simplify 0 into 0
19.961 * [taylor]: Taking taylor expansion of 0 in M
19.961 * [backup-simplify]: Simplify 0 into 0
19.962 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
19.962 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
19.963 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
19.964 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
19.969 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.970 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
19.973 * [backup-simplify]: Simplify (/ (- 0 (pow +nan.0 2) (+)) (* 2 0)) into +nan.0
19.974 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (* +nan.0 (pow (pow d 4) 1/3)))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
19.976 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow l 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow l 1)))) 2) into 0
19.977 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
19.978 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
19.979 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0))) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
19.980 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
19.980 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
19.980 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
19.981 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
19.982 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.984 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.984 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
19.985 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
19.985 * [taylor]: Taking taylor expansion of +nan.0 in M
19.985 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.985 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
19.985 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
19.985 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
19.985 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.985 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
19.985 * [taylor]: Taking taylor expansion of (pow D 2) in M
19.985 * [taylor]: Taking taylor expansion of D in M
19.985 * [backup-simplify]: Simplify D into D
19.985 * [taylor]: Taking taylor expansion of (pow M 2) in M
19.985 * [taylor]: Taking taylor expansion of M in M
19.985 * [backup-simplify]: Simplify 0 into 0
19.985 * [backup-simplify]: Simplify 1 into 1
19.985 * [backup-simplify]: Simplify (* D D) into (pow D 2)
19.985 * [backup-simplify]: Simplify (* 1 1) into 1
19.986 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
19.986 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
19.986 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
19.986 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
19.986 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
19.986 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
19.986 * [taylor]: Taking taylor expansion of 1/6 in M
19.986 * [backup-simplify]: Simplify 1/6 into 1/6
19.986 * [taylor]: Taking taylor expansion of (log l) in M
19.986 * [taylor]: Taking taylor expansion of l in M
19.986 * [backup-simplify]: Simplify l into l
19.986 * [backup-simplify]: Simplify (log l) into (log l)
19.986 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.986 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.986 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
19.986 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
19.986 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
19.986 * [taylor]: Taking taylor expansion of 1/3 in M
19.986 * [backup-simplify]: Simplify 1/3 into 1/3
19.986 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
19.986 * [taylor]: Taking taylor expansion of (pow d 4) in M
19.986 * [taylor]: Taking taylor expansion of d in M
19.986 * [backup-simplify]: Simplify d into d
19.987 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.987 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.987 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.987 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.987 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.987 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
19.987 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
19.988 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
19.988 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.988 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
19.988 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
19.988 * [taylor]: Taking taylor expansion of +nan.0 in D
19.989 * [backup-simplify]: Simplify +nan.0 into +nan.0
19.989 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
19.989 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
19.989 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
19.989 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
19.989 * [taylor]: Taking taylor expansion of (pow D 2) in D
19.989 * [taylor]: Taking taylor expansion of D in D
19.989 * [backup-simplify]: Simplify 0 into 0
19.989 * [backup-simplify]: Simplify 1 into 1
19.989 * [backup-simplify]: Simplify (* 1 1) into 1
19.989 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
19.990 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
19.990 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
19.990 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
19.990 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
19.990 * [taylor]: Taking taylor expansion of 1/6 in D
19.990 * [backup-simplify]: Simplify 1/6 into 1/6
19.990 * [taylor]: Taking taylor expansion of (log l) in D
19.990 * [taylor]: Taking taylor expansion of l in D
19.990 * [backup-simplify]: Simplify l into l
19.990 * [backup-simplify]: Simplify (log l) into (log l)
19.990 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
19.990 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
19.990 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
19.990 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
19.990 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
19.990 * [taylor]: Taking taylor expansion of 1/3 in D
19.990 * [backup-simplify]: Simplify 1/3 into 1/3
19.990 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
19.990 * [taylor]: Taking taylor expansion of (pow d 4) in D
19.990 * [taylor]: Taking taylor expansion of d in D
19.990 * [backup-simplify]: Simplify d into d
19.990 * [backup-simplify]: Simplify (* d d) into (pow d 2)
19.990 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
19.990 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
19.990 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
19.991 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
19.991 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
19.991 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
19.991 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
19.992 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.992 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
19.992 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
19.993 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
19.993 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
19.994 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
19.995 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
19.996 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
19.996 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
19.997 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
19.997 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
19.998 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
19.998 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
19.998 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
19.999 * [backup-simplify]: Simplify (- (/ 0 (pow D 2)) (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (/ 0 (pow D 2))))) into 0
19.999 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) 0) (* 0 (* (pow l 1/6) (pow (pow d 4) 1/3)))) into 0
20.000 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
20.000 * [backup-simplify]: Simplify (- 0) into 0
20.000 * [taylor]: Taking taylor expansion of 0 in D
20.000 * [backup-simplify]: Simplify 0 into 0
20.000 * [taylor]: Taking taylor expansion of 0 in D
20.001 * [backup-simplify]: Simplify 0 into 0
20.001 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.001 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.002 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.002 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.003 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.004 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
20.004 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
20.005 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.005 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.006 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.007 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (fabs (pow (/ l d) 1/3)) (/ 0 1)))) into 0
20.007 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ l d) 1/3)) 0) (* 0 (* (pow l 1/6) (pow (pow d 4) 1/3)))) into 0
20.008 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
20.008 * [backup-simplify]: Simplify (- 0) into 0
20.008 * [backup-simplify]: Simplify 0 into 0
20.009 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.010 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.015 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
20.016 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.017 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 4 (log d)))))) into 0
20.018 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.019 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.020 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
20.021 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4/3))))) into 0
20.023 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow l 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow l 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow l 1)))) 6) into 0
20.025 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
20.026 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.027 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.028 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.029 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.030 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.030 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.032 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
20.034 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))))) into 0
20.034 * [taylor]: Taking taylor expansion of 0 in l
20.034 * [backup-simplify]: Simplify 0 into 0
20.034 * [taylor]: Taking taylor expansion of 0 in h
20.034 * [backup-simplify]: Simplify 0 into 0
20.034 * [taylor]: Taking taylor expansion of 0 in h
20.034 * [backup-simplify]: Simplify 0 into 0
20.034 * [taylor]: Taking taylor expansion of 0 in h
20.034 * [backup-simplify]: Simplify 0 into 0
20.035 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
20.036 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
20.038 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
20.040 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
20.041 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.042 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.042 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
20.043 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
20.048 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
20.049 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
20.050 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
20.052 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.053 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.054 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.054 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.055 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.056 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.057 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
20.059 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))))) into 0
20.059 * [taylor]: Taking taylor expansion of 0 in h
20.059 * [backup-simplify]: Simplify 0 into 0
20.059 * [taylor]: Taking taylor expansion of 0 in M
20.059 * [backup-simplify]: Simplify 0 into 0
20.059 * [taylor]: Taking taylor expansion of 0 in M
20.059 * [backup-simplify]: Simplify 0 into 0
20.059 * [taylor]: Taking taylor expansion of 0 in M
20.059 * [backup-simplify]: Simplify 0 into 0
20.059 * [taylor]: Taking taylor expansion of 0 in M
20.059 * [backup-simplify]: Simplify 0 into 0
20.059 * [taylor]: Taking taylor expansion of 0 in M
20.059 * [backup-simplify]: Simplify 0 into 0
20.060 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
20.061 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
20.064 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
20.065 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
20.067 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.068 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
20.072 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* +nan.0 +nan.0)))) (* 2 0)) into +nan.0
20.074 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (+ (* +nan.0 0) (* +nan.0 (pow (pow d 4) 1/3))))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
20.076 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow l 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow l 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow l 1)))) 6) into 0
20.078 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
20.079 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.080 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0)))) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.081 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.082 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.083 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.083 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.085 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.088 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.088 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
20.088 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
20.088 * [taylor]: Taking taylor expansion of +nan.0 in M
20.088 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.088 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
20.088 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.088 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.088 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.088 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.088 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.088 * [taylor]: Taking taylor expansion of D in M
20.088 * [backup-simplify]: Simplify D into D
20.088 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.088 * [taylor]: Taking taylor expansion of M in M
20.088 * [backup-simplify]: Simplify 0 into 0
20.088 * [backup-simplify]: Simplify 1 into 1
20.088 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.089 * [backup-simplify]: Simplify (* 1 1) into 1
20.089 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.089 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.089 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
20.089 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
20.089 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
20.089 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
20.089 * [taylor]: Taking taylor expansion of 1/6 in M
20.089 * [backup-simplify]: Simplify 1/6 into 1/6
20.089 * [taylor]: Taking taylor expansion of (log l) in M
20.089 * [taylor]: Taking taylor expansion of l in M
20.089 * [backup-simplify]: Simplify l into l
20.089 * [backup-simplify]: Simplify (log l) into (log l)
20.089 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.089 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.089 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.089 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.089 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.089 * [taylor]: Taking taylor expansion of 1/3 in M
20.089 * [backup-simplify]: Simplify 1/3 into 1/3
20.090 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.090 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.090 * [taylor]: Taking taylor expansion of d in M
20.090 * [backup-simplify]: Simplify d into d
20.090 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.090 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.090 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.090 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.090 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.090 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
20.090 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.091 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.091 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.091 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
20.091 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
20.091 * [taylor]: Taking taylor expansion of +nan.0 in D
20.092 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.092 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
20.092 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.092 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.092 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.092 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.092 * [taylor]: Taking taylor expansion of D in D
20.092 * [backup-simplify]: Simplify 0 into 0
20.092 * [backup-simplify]: Simplify 1 into 1
20.092 * [backup-simplify]: Simplify (* 1 1) into 1
20.093 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.093 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
20.093 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
20.093 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
20.093 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
20.093 * [taylor]: Taking taylor expansion of 1/6 in D
20.093 * [backup-simplify]: Simplify 1/6 into 1/6
20.093 * [taylor]: Taking taylor expansion of (log l) in D
20.093 * [taylor]: Taking taylor expansion of l in D
20.093 * [backup-simplify]: Simplify l into l
20.093 * [backup-simplify]: Simplify (log l) into (log l)
20.093 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.093 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.093 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.093 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.093 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.093 * [taylor]: Taking taylor expansion of 1/3 in D
20.093 * [backup-simplify]: Simplify 1/3 into 1/3
20.093 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.093 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.093 * [taylor]: Taking taylor expansion of d in D
20.093 * [backup-simplify]: Simplify d into d
20.093 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.093 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.093 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.094 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.094 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.094 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
20.094 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.094 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.095 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.095 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.100 * [backup-simplify]: Simplify (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (/ 1 l) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (pow (* (/ 1 (/ 1 D)) (* (/ 1 (/ 1 M)) (* (/ 1 h) (* 1 1)))) 2)) (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (/ 1 l) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (* (pow (/ 1 D) -2) (* (pow (/ 1 M) -2) (* (/ 1 h) (* 1 1))))) (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (/ 1 l) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (pow (* (/ 1 (/ 1 D)) (* (/ 1 (/ 1 M)) (* 1 (* 1 1)))) 2)))) into (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))))))
20.102 * [backup-simplify]: Simplify (* (* (* (fabs (/ (cbrt (/ 1 (- d))) (cbrt (/ 1 (- l))))) (sqrt (/ (cbrt (/ 1 (- d))) (cbrt (/ 1 (- l)))))) (sqrt (/ (/ 1 (- d)) (/ 1 (- h))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (/ 1 (- h))))) into (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
20.102 * [approximate]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in (d l h M D) around 0
20.102 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in D
20.102 * [taylor]: Taking taylor expansion of -1/4 in D
20.102 * [backup-simplify]: Simplify -1/4 into -1/4
20.102 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in D
20.102 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in D
20.102 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.102 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.102 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in D
20.102 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.102 * [taylor]: Taking taylor expansion of D in D
20.102 * [backup-simplify]: Simplify 0 into 0
20.102 * [backup-simplify]: Simplify 1 into 1
20.102 * [taylor]: Taking taylor expansion of (pow M 2) in D
20.102 * [taylor]: Taking taylor expansion of M in D
20.102 * [backup-simplify]: Simplify M into M
20.103 * [backup-simplify]: Simplify (* 1 1) into 1
20.103 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.103 * [backup-simplify]: Simplify (* 1 (pow M 2)) into (pow M 2)
20.103 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow M 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow M 2))
20.103 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in D
20.103 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
20.103 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
20.103 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
20.103 * [taylor]: Taking taylor expansion of 1/6 in D
20.103 * [backup-simplify]: Simplify 1/6 into 1/6
20.103 * [taylor]: Taking taylor expansion of (log l) in D
20.103 * [taylor]: Taking taylor expansion of l in D
20.103 * [backup-simplify]: Simplify l into l
20.103 * [backup-simplify]: Simplify (log l) into (log l)
20.103 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.104 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.104 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in D
20.104 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in D
20.104 * [taylor]: Taking taylor expansion of (/ 1 h) in D
20.104 * [taylor]: Taking taylor expansion of h in D
20.104 * [backup-simplify]: Simplify h into h
20.104 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.104 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.104 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.104 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.104 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.104 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.104 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.104 * [taylor]: Taking taylor expansion of 1/3 in D
20.104 * [backup-simplify]: Simplify 1/3 into 1/3
20.104 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.104 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.104 * [taylor]: Taking taylor expansion of d in D
20.104 * [backup-simplify]: Simplify d into d
20.104 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.104 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.104 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.104 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.105 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.105 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in M
20.105 * [taylor]: Taking taylor expansion of -1/4 in M
20.105 * [backup-simplify]: Simplify -1/4 into -1/4
20.105 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in M
20.105 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.105 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.105 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.105 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.105 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.105 * [taylor]: Taking taylor expansion of D in M
20.105 * [backup-simplify]: Simplify D into D
20.105 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.105 * [taylor]: Taking taylor expansion of M in M
20.105 * [backup-simplify]: Simplify 0 into 0
20.105 * [backup-simplify]: Simplify 1 into 1
20.105 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.106 * [backup-simplify]: Simplify (* 1 1) into 1
20.106 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.106 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.106 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in M
20.106 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
20.106 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
20.106 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
20.106 * [taylor]: Taking taylor expansion of 1/6 in M
20.106 * [backup-simplify]: Simplify 1/6 into 1/6
20.106 * [taylor]: Taking taylor expansion of (log l) in M
20.106 * [taylor]: Taking taylor expansion of l in M
20.106 * [backup-simplify]: Simplify l into l
20.106 * [backup-simplify]: Simplify (log l) into (log l)
20.106 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.106 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.106 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in M
20.106 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in M
20.107 * [taylor]: Taking taylor expansion of (/ 1 h) in M
20.107 * [taylor]: Taking taylor expansion of h in M
20.107 * [backup-simplify]: Simplify h into h
20.107 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.107 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.107 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.107 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.107 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.107 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.107 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.107 * [taylor]: Taking taylor expansion of 1/3 in M
20.107 * [backup-simplify]: Simplify 1/3 into 1/3
20.107 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.107 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.107 * [taylor]: Taking taylor expansion of d in M
20.107 * [backup-simplify]: Simplify d into d
20.107 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.107 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.107 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.107 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.108 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.108 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in h
20.108 * [taylor]: Taking taylor expansion of -1/4 in h
20.108 * [backup-simplify]: Simplify -1/4 into -1/4
20.108 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in h
20.108 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
20.108 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
20.108 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.108 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
20.108 * [taylor]: Taking taylor expansion of (pow D 2) in h
20.108 * [taylor]: Taking taylor expansion of D in h
20.108 * [backup-simplify]: Simplify D into D
20.108 * [taylor]: Taking taylor expansion of (pow M 2) in h
20.108 * [taylor]: Taking taylor expansion of M in h
20.108 * [backup-simplify]: Simplify M into M
20.108 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.108 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.108 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.109 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.109 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in h
20.109 * [taylor]: Taking taylor expansion of (pow l 1/6) in h
20.109 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in h
20.109 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in h
20.109 * [taylor]: Taking taylor expansion of 1/6 in h
20.109 * [backup-simplify]: Simplify 1/6 into 1/6
20.109 * [taylor]: Taking taylor expansion of (log l) in h
20.109 * [taylor]: Taking taylor expansion of l in h
20.109 * [backup-simplify]: Simplify l into l
20.109 * [backup-simplify]: Simplify (log l) into (log l)
20.109 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.109 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.109 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in h
20.109 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
20.109 * [taylor]: Taking taylor expansion of (/ 1 h) in h
20.109 * [taylor]: Taking taylor expansion of h in h
20.109 * [backup-simplify]: Simplify 0 into 0
20.109 * [backup-simplify]: Simplify 1 into 1
20.110 * [backup-simplify]: Simplify (/ 1 1) into 1
20.110 * [backup-simplify]: Simplify (sqrt 0) into 0
20.112 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
20.112 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
20.112 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
20.112 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
20.112 * [taylor]: Taking taylor expansion of 1/3 in h
20.112 * [backup-simplify]: Simplify 1/3 into 1/3
20.112 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
20.112 * [taylor]: Taking taylor expansion of (pow d 4) in h
20.112 * [taylor]: Taking taylor expansion of d in h
20.112 * [backup-simplify]: Simplify d into d
20.112 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.112 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.112 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.112 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.112 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.112 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in l
20.112 * [taylor]: Taking taylor expansion of -1/4 in l
20.112 * [backup-simplify]: Simplify -1/4 into -1/4
20.113 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in l
20.113 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
20.113 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
20.113 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.113 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
20.113 * [taylor]: Taking taylor expansion of (pow D 2) in l
20.113 * [taylor]: Taking taylor expansion of D in l
20.113 * [backup-simplify]: Simplify D into D
20.113 * [taylor]: Taking taylor expansion of (pow M 2) in l
20.113 * [taylor]: Taking taylor expansion of M in l
20.113 * [backup-simplify]: Simplify M into M
20.113 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.113 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.113 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.113 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.113 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in l
20.113 * [taylor]: Taking taylor expansion of (pow l 1/6) in l
20.113 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in l
20.113 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in l
20.114 * [taylor]: Taking taylor expansion of 1/6 in l
20.114 * [backup-simplify]: Simplify 1/6 into 1/6
20.114 * [taylor]: Taking taylor expansion of (log l) in l
20.114 * [taylor]: Taking taylor expansion of l in l
20.114 * [backup-simplify]: Simplify 0 into 0
20.114 * [backup-simplify]: Simplify 1 into 1
20.114 * [backup-simplify]: Simplify (log 1) into 0
20.115 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
20.115 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.115 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.115 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in l
20.115 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
20.115 * [taylor]: Taking taylor expansion of (/ 1 h) in l
20.115 * [taylor]: Taking taylor expansion of h in l
20.115 * [backup-simplify]: Simplify h into h
20.115 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.115 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.115 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.115 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.115 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
20.115 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
20.115 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
20.115 * [taylor]: Taking taylor expansion of 1/3 in l
20.115 * [backup-simplify]: Simplify 1/3 into 1/3
20.115 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
20.115 * [taylor]: Taking taylor expansion of (pow d 4) in l
20.115 * [taylor]: Taking taylor expansion of d in l
20.115 * [backup-simplify]: Simplify d into d
20.116 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.116 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.116 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.116 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.116 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.116 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in d
20.116 * [taylor]: Taking taylor expansion of -1/4 in d
20.116 * [backup-simplify]: Simplify -1/4 into -1/4
20.116 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in d
20.116 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
20.116 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
20.116 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.116 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
20.116 * [taylor]: Taking taylor expansion of (pow D 2) in d
20.116 * [taylor]: Taking taylor expansion of D in d
20.116 * [backup-simplify]: Simplify D into D
20.116 * [taylor]: Taking taylor expansion of (pow M 2) in d
20.116 * [taylor]: Taking taylor expansion of M in d
20.116 * [backup-simplify]: Simplify M into M
20.116 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.117 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.117 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.117 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.117 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in d
20.117 * [taylor]: Taking taylor expansion of (pow l 1/6) in d
20.117 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in d
20.117 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in d
20.117 * [taylor]: Taking taylor expansion of 1/6 in d
20.117 * [backup-simplify]: Simplify 1/6 into 1/6
20.117 * [taylor]: Taking taylor expansion of (log l) in d
20.117 * [taylor]: Taking taylor expansion of l in d
20.117 * [backup-simplify]: Simplify l into l
20.117 * [backup-simplify]: Simplify (log l) into (log l)
20.117 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.117 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.117 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in d
20.117 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
20.117 * [taylor]: Taking taylor expansion of (/ 1 h) in d
20.117 * [taylor]: Taking taylor expansion of h in d
20.117 * [backup-simplify]: Simplify h into h
20.118 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.118 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.118 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.118 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.118 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
20.118 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
20.118 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
20.118 * [taylor]: Taking taylor expansion of 1/3 in d
20.118 * [backup-simplify]: Simplify 1/3 into 1/3
20.118 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
20.118 * [taylor]: Taking taylor expansion of (pow d 4) in d
20.118 * [taylor]: Taking taylor expansion of d in d
20.118 * [backup-simplify]: Simplify 0 into 0
20.118 * [backup-simplify]: Simplify 1 into 1
20.124 * [backup-simplify]: Simplify (* 1 1) into 1
20.124 * [backup-simplify]: Simplify (* 1 1) into 1
20.125 * [backup-simplify]: Simplify (log 1) into 0
20.125 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.125 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
20.125 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
20.125 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in d
20.125 * [taylor]: Taking taylor expansion of -1/4 in d
20.126 * [backup-simplify]: Simplify -1/4 into -1/4
20.126 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in d
20.126 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
20.126 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
20.126 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.126 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
20.126 * [taylor]: Taking taylor expansion of (pow D 2) in d
20.126 * [taylor]: Taking taylor expansion of D in d
20.126 * [backup-simplify]: Simplify D into D
20.126 * [taylor]: Taking taylor expansion of (pow M 2) in d
20.126 * [taylor]: Taking taylor expansion of M in d
20.126 * [backup-simplify]: Simplify M into M
20.126 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.126 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.126 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.126 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.126 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in d
20.126 * [taylor]: Taking taylor expansion of (pow l 1/6) in d
20.126 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in d
20.127 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in d
20.127 * [taylor]: Taking taylor expansion of 1/6 in d
20.127 * [backup-simplify]: Simplify 1/6 into 1/6
20.127 * [taylor]: Taking taylor expansion of (log l) in d
20.127 * [taylor]: Taking taylor expansion of l in d
20.127 * [backup-simplify]: Simplify l into l
20.127 * [backup-simplify]: Simplify (log l) into (log l)
20.127 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.127 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.127 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in d
20.127 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
20.127 * [taylor]: Taking taylor expansion of (/ 1 h) in d
20.127 * [taylor]: Taking taylor expansion of h in d
20.127 * [backup-simplify]: Simplify h into h
20.127 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.127 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.127 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.127 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.127 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
20.127 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
20.127 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
20.127 * [taylor]: Taking taylor expansion of 1/3 in d
20.127 * [backup-simplify]: Simplify 1/3 into 1/3
20.127 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
20.127 * [taylor]: Taking taylor expansion of (pow d 4) in d
20.128 * [taylor]: Taking taylor expansion of d in d
20.128 * [backup-simplify]: Simplify 0 into 0
20.128 * [backup-simplify]: Simplify 1 into 1
20.128 * [backup-simplify]: Simplify (* 1 1) into 1
20.128 * [backup-simplify]: Simplify (* 1 1) into 1
20.129 * [backup-simplify]: Simplify (log 1) into 0
20.129 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.129 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
20.130 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
20.130 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (pow d 4/3)) into (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))
20.130 * [backup-simplify]: Simplify (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) into (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.131 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.131 * [backup-simplify]: Simplify (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
20.131 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in l
20.131 * [taylor]: Taking taylor expansion of -1/4 in l
20.131 * [backup-simplify]: Simplify -1/4 into -1/4
20.131 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in l
20.131 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
20.131 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
20.131 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.131 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
20.131 * [taylor]: Taking taylor expansion of (pow D 2) in l
20.131 * [taylor]: Taking taylor expansion of D in l
20.131 * [backup-simplify]: Simplify D into D
20.132 * [taylor]: Taking taylor expansion of (pow M 2) in l
20.132 * [taylor]: Taking taylor expansion of M in l
20.132 * [backup-simplify]: Simplify M into M
20.132 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.132 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.132 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.132 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.132 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in l
20.132 * [taylor]: Taking taylor expansion of (pow l 1/6) in l
20.132 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in l
20.132 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in l
20.132 * [taylor]: Taking taylor expansion of 1/6 in l
20.132 * [backup-simplify]: Simplify 1/6 into 1/6
20.132 * [taylor]: Taking taylor expansion of (log l) in l
20.132 * [taylor]: Taking taylor expansion of l in l
20.132 * [backup-simplify]: Simplify 0 into 0
20.132 * [backup-simplify]: Simplify 1 into 1
20.133 * [backup-simplify]: Simplify (log 1) into 0
20.133 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
20.133 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.133 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.133 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in l
20.133 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
20.133 * [taylor]: Taking taylor expansion of (/ 1 h) in l
20.133 * [taylor]: Taking taylor expansion of h in l
20.133 * [backup-simplify]: Simplify h into h
20.134 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.134 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.134 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.134 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.134 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
20.134 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
20.134 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
20.134 * [taylor]: Taking taylor expansion of 1/3 in l
20.134 * [backup-simplify]: Simplify 1/3 into 1/3
20.134 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
20.134 * [taylor]: Taking taylor expansion of (pow d 4) in l
20.134 * [taylor]: Taking taylor expansion of d in l
20.134 * [backup-simplify]: Simplify d into d
20.134 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.134 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.134 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.134 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.134 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.135 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) into (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))
20.135 * [backup-simplify]: Simplify (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) into (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.135 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.136 * [backup-simplify]: Simplify (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
20.136 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in h
20.136 * [taylor]: Taking taylor expansion of -1/4 in h
20.136 * [backup-simplify]: Simplify -1/4 into -1/4
20.136 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in h
20.136 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
20.136 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
20.136 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.136 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
20.136 * [taylor]: Taking taylor expansion of (pow D 2) in h
20.136 * [taylor]: Taking taylor expansion of D in h
20.136 * [backup-simplify]: Simplify D into D
20.136 * [taylor]: Taking taylor expansion of (pow M 2) in h
20.136 * [taylor]: Taking taylor expansion of M in h
20.136 * [backup-simplify]: Simplify M into M
20.136 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.137 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.137 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.137 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.137 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in h
20.137 * [taylor]: Taking taylor expansion of (pow l 1/6) in h
20.137 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in h
20.137 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in h
20.137 * [taylor]: Taking taylor expansion of 1/6 in h
20.137 * [backup-simplify]: Simplify 1/6 into 1/6
20.137 * [taylor]: Taking taylor expansion of (log l) in h
20.137 * [taylor]: Taking taylor expansion of l in h
20.137 * [backup-simplify]: Simplify l into l
20.137 * [backup-simplify]: Simplify (log l) into (log l)
20.137 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.137 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.137 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in h
20.137 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
20.137 * [taylor]: Taking taylor expansion of (/ 1 h) in h
20.137 * [taylor]: Taking taylor expansion of h in h
20.137 * [backup-simplify]: Simplify 0 into 0
20.137 * [backup-simplify]: Simplify 1 into 1
20.138 * [backup-simplify]: Simplify (/ 1 1) into 1
20.138 * [backup-simplify]: Simplify (sqrt 0) into 0
20.140 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
20.140 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
20.140 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
20.140 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
20.140 * [taylor]: Taking taylor expansion of 1/3 in h
20.140 * [backup-simplify]: Simplify 1/3 into 1/3
20.140 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
20.140 * [taylor]: Taking taylor expansion of (pow d 4) in h
20.140 * [taylor]: Taking taylor expansion of d in h
20.140 * [backup-simplify]: Simplify d into d
20.140 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.140 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.140 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.140 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.140 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.141 * [backup-simplify]: Simplify (* 0 (pow (pow d 4) 1/3)) into 0
20.141 * [backup-simplify]: Simplify (* (pow l 1/6) 0) into 0
20.141 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) into 0
20.141 * [backup-simplify]: Simplify (* -1/4 0) into 0
20.141 * [taylor]: Taking taylor expansion of 0 in M
20.141 * [backup-simplify]: Simplify 0 into 0
20.142 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.143 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.144 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
20.145 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.145 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (* 4 (log d)))) into 0
20.146 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
20.146 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (pow d 4/3))) into 0
20.147 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
20.147 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
20.148 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.149 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into 0
20.149 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.149 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.149 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.150 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.150 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
20.151 * [backup-simplify]: Simplify (+ (* -1/4 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
20.152 * [taylor]: Taking taylor expansion of 0 in l
20.152 * [backup-simplify]: Simplify 0 into 0
20.152 * [taylor]: Taking taylor expansion of 0 in h
20.152 * [backup-simplify]: Simplify 0 into 0
20.152 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.152 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.153 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.153 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.154 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.154 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.156 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
20.156 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
20.157 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
20.158 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.158 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into 0
20.158 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.158 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.158 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.159 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.159 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
20.161 * [backup-simplify]: Simplify (+ (* -1/4 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
20.161 * [taylor]: Taking taylor expansion of 0 in h
20.161 * [backup-simplify]: Simplify 0 into 0
20.161 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.161 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.162 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.163 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.163 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.164 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (pow (pow d 4) 1/3))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
20.165 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
20.165 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
20.166 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.167 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0)) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.167 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.167 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.167 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.168 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.169 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.170 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.170 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
20.170 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
20.170 * [taylor]: Taking taylor expansion of +nan.0 in M
20.170 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.170 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
20.170 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.170 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.170 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.170 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.170 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.170 * [taylor]: Taking taylor expansion of D in M
20.170 * [backup-simplify]: Simplify D into D
20.170 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.170 * [taylor]: Taking taylor expansion of M in M
20.170 * [backup-simplify]: Simplify 0 into 0
20.170 * [backup-simplify]: Simplify 1 into 1
20.171 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.171 * [backup-simplify]: Simplify (* 1 1) into 1
20.171 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.171 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.171 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
20.171 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
20.171 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
20.171 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
20.171 * [taylor]: Taking taylor expansion of 1/6 in M
20.171 * [backup-simplify]: Simplify 1/6 into 1/6
20.171 * [taylor]: Taking taylor expansion of (log l) in M
20.171 * [taylor]: Taking taylor expansion of l in M
20.171 * [backup-simplify]: Simplify l into l
20.171 * [backup-simplify]: Simplify (log l) into (log l)
20.172 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.172 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.172 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.172 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.172 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.172 * [taylor]: Taking taylor expansion of 1/3 in M
20.172 * [backup-simplify]: Simplify 1/3 into 1/3
20.172 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.172 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.172 * [taylor]: Taking taylor expansion of d in M
20.172 * [backup-simplify]: Simplify d into d
20.172 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.172 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.172 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.172 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.172 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.172 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
20.173 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.173 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.174 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.174 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
20.174 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
20.174 * [taylor]: Taking taylor expansion of +nan.0 in D
20.174 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.174 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
20.174 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.174 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.174 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.174 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.174 * [taylor]: Taking taylor expansion of D in D
20.174 * [backup-simplify]: Simplify 0 into 0
20.174 * [backup-simplify]: Simplify 1 into 1
20.175 * [backup-simplify]: Simplify (* 1 1) into 1
20.175 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.175 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
20.175 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
20.175 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
20.175 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
20.175 * [taylor]: Taking taylor expansion of 1/6 in D
20.175 * [backup-simplify]: Simplify 1/6 into 1/6
20.175 * [taylor]: Taking taylor expansion of (log l) in D
20.175 * [taylor]: Taking taylor expansion of l in D
20.175 * [backup-simplify]: Simplify l into l
20.175 * [backup-simplify]: Simplify (log l) into (log l)
20.175 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.175 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.175 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.175 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.176 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.176 * [taylor]: Taking taylor expansion of 1/3 in D
20.176 * [backup-simplify]: Simplify 1/3 into 1/3
20.176 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.176 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.176 * [taylor]: Taking taylor expansion of d in D
20.176 * [backup-simplify]: Simplify d into d
20.176 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.176 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.176 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.176 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.176 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.176 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
20.177 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.177 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.177 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.178 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.179 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.180 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.183 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
20.184 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.184 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (* 4 (log d))))) into 0
20.186 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.186 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.187 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
20.187 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (pow d 4/3)))) into 0
20.189 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow l 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow l 1)))) 2) into 0
20.190 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
20.191 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.192 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
20.193 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.193 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.194 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.194 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.195 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
20.196 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
20.197 * [taylor]: Taking taylor expansion of 0 in l
20.197 * [backup-simplify]: Simplify 0 into 0
20.197 * [taylor]: Taking taylor expansion of 0 in h
20.197 * [backup-simplify]: Simplify 0 into 0
20.197 * [taylor]: Taking taylor expansion of 0 in h
20.197 * [backup-simplify]: Simplify 0 into 0
20.197 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
20.198 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
20.199 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
20.200 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
20.202 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.202 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.203 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
20.203 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
20.206 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
20.206 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
20.207 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
20.209 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.209 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
20.210 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.210 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.211 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.211 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.212 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
20.213 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
20.213 * [taylor]: Taking taylor expansion of 0 in h
20.214 * [backup-simplify]: Simplify 0 into 0
20.214 * [taylor]: Taking taylor expansion of 0 in M
20.214 * [backup-simplify]: Simplify 0 into 0
20.214 * [taylor]: Taking taylor expansion of 0 in M
20.214 * [backup-simplify]: Simplify 0 into 0
20.214 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
20.215 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
20.216 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
20.217 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
20.219 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.219 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
20.223 * [backup-simplify]: Simplify (/ (- 0 (pow +nan.0 2) (+)) (* 2 0)) into +nan.0
20.224 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (* +nan.0 (pow (pow d 4) 1/3)))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
20.225 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow l 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow l 1)))) 2) into 0
20.226 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
20.227 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.228 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0))) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.229 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.229 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.230 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.231 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.232 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.234 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.234 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
20.234 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
20.234 * [taylor]: Taking taylor expansion of +nan.0 in M
20.234 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.234 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
20.234 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.234 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.235 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.235 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.235 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.235 * [taylor]: Taking taylor expansion of D in M
20.235 * [backup-simplify]: Simplify D into D
20.235 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.235 * [taylor]: Taking taylor expansion of M in M
20.235 * [backup-simplify]: Simplify 0 into 0
20.235 * [backup-simplify]: Simplify 1 into 1
20.235 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.235 * [backup-simplify]: Simplify (* 1 1) into 1
20.235 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.236 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.236 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
20.236 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
20.236 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
20.236 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
20.236 * [taylor]: Taking taylor expansion of 1/6 in M
20.236 * [backup-simplify]: Simplify 1/6 into 1/6
20.236 * [taylor]: Taking taylor expansion of (log l) in M
20.236 * [taylor]: Taking taylor expansion of l in M
20.236 * [backup-simplify]: Simplify l into l
20.236 * [backup-simplify]: Simplify (log l) into (log l)
20.236 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.236 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.236 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.236 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.236 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.236 * [taylor]: Taking taylor expansion of 1/3 in M
20.236 * [backup-simplify]: Simplify 1/3 into 1/3
20.236 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.236 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.236 * [taylor]: Taking taylor expansion of d in M
20.236 * [backup-simplify]: Simplify d into d
20.236 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.236 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.236 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.237 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.237 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.237 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
20.237 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.238 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.238 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.238 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
20.238 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
20.238 * [taylor]: Taking taylor expansion of +nan.0 in D
20.238 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.238 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
20.238 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.238 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.238 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.238 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.239 * [taylor]: Taking taylor expansion of D in D
20.239 * [backup-simplify]: Simplify 0 into 0
20.239 * [backup-simplify]: Simplify 1 into 1
20.239 * [backup-simplify]: Simplify (* 1 1) into 1
20.239 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.239 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
20.239 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
20.239 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
20.239 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
20.239 * [taylor]: Taking taylor expansion of 1/6 in D
20.239 * [backup-simplify]: Simplify 1/6 into 1/6
20.239 * [taylor]: Taking taylor expansion of (log l) in D
20.240 * [taylor]: Taking taylor expansion of l in D
20.240 * [backup-simplify]: Simplify l into l
20.240 * [backup-simplify]: Simplify (log l) into (log l)
20.240 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.240 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.240 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.240 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.240 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.240 * [taylor]: Taking taylor expansion of 1/3 in D
20.240 * [backup-simplify]: Simplify 1/3 into 1/3
20.240 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.240 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.240 * [taylor]: Taking taylor expansion of d in D
20.240 * [backup-simplify]: Simplify d into d
20.240 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.240 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.240 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.240 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.240 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.241 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
20.241 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.241 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.241 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.242 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.242 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.242 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.243 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.244 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.245 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.246 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
20.246 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
20.247 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.247 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.248 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.248 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.249 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
20.249 * [backup-simplify]: Simplify (- (/ 0 (pow D 2)) (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (/ 0 (pow D 2))))) into 0
20.249 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) 0) (* 0 (* (pow l 1/6) (pow (pow d 4) 1/3)))) into 0
20.250 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
20.251 * [backup-simplify]: Simplify (- 0) into 0
20.251 * [taylor]: Taking taylor expansion of 0 in D
20.251 * [backup-simplify]: Simplify 0 into 0
20.251 * [taylor]: Taking taylor expansion of 0 in D
20.251 * [backup-simplify]: Simplify 0 into 0
20.251 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.251 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.252 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.252 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.253 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.254 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
20.255 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
20.255 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.256 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.256 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.257 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (fabs (pow (/ l d) 1/3)) (/ 0 1)))) into 0
20.257 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ l d) 1/3)) 0) (* 0 (* (pow l 1/6) (pow (pow d 4) 1/3)))) into 0
20.257 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
20.258 * [backup-simplify]: Simplify (- 0) into 0
20.258 * [backup-simplify]: Simplify 0 into 0
20.258 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.259 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.261 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
20.262 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.263 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 4 (log d)))))) into 0
20.264 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.264 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.264 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
20.265 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4/3))))) into 0
20.266 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow l 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow l 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow l 1)))) 6) into 0
20.267 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
20.272 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.273 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.273 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.274 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.274 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.275 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.276 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
20.277 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))))) into 0
20.277 * [taylor]: Taking taylor expansion of 0 in l
20.277 * [backup-simplify]: Simplify 0 into 0
20.277 * [taylor]: Taking taylor expansion of 0 in h
20.277 * [backup-simplify]: Simplify 0 into 0
20.277 * [taylor]: Taking taylor expansion of 0 in h
20.277 * [backup-simplify]: Simplify 0 into 0
20.277 * [taylor]: Taking taylor expansion of 0 in h
20.277 * [backup-simplify]: Simplify 0 into 0
20.277 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
20.278 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
20.279 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
20.280 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
20.282 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.282 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.282 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
20.283 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
20.286 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
20.286 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
20.287 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
20.288 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.289 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.289 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.290 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.291 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.292 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.293 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
20.295 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))))) into 0
20.295 * [taylor]: Taking taylor expansion of 0 in h
20.295 * [backup-simplify]: Simplify 0 into 0
20.295 * [taylor]: Taking taylor expansion of 0 in M
20.295 * [backup-simplify]: Simplify 0 into 0
20.295 * [taylor]: Taking taylor expansion of 0 in M
20.295 * [backup-simplify]: Simplify 0 into 0
20.295 * [taylor]: Taking taylor expansion of 0 in M
20.295 * [backup-simplify]: Simplify 0 into 0
20.296 * [taylor]: Taking taylor expansion of 0 in M
20.296 * [backup-simplify]: Simplify 0 into 0
20.296 * [taylor]: Taking taylor expansion of 0 in M
20.296 * [backup-simplify]: Simplify 0 into 0
20.297 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
20.297 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
20.300 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
20.301 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
20.303 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.304 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
20.308 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* +nan.0 +nan.0)))) (* 2 0)) into +nan.0
20.310 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (+ (* +nan.0 0) (* +nan.0 (pow (pow d 4) 1/3))))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
20.313 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow l 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow l 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow l 1)))) 6) into 0
20.314 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
20.316 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.317 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0)))) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.318 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.318 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.319 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.320 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.322 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.325 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.325 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
20.325 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
20.325 * [taylor]: Taking taylor expansion of +nan.0 in M
20.325 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.325 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
20.325 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.325 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.325 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.325 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.325 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.325 * [taylor]: Taking taylor expansion of D in M
20.325 * [backup-simplify]: Simplify D into D
20.325 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.325 * [taylor]: Taking taylor expansion of M in M
20.325 * [backup-simplify]: Simplify 0 into 0
20.325 * [backup-simplify]: Simplify 1 into 1
20.325 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.326 * [backup-simplify]: Simplify (* 1 1) into 1
20.326 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.326 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.326 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
20.326 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
20.326 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
20.326 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
20.326 * [taylor]: Taking taylor expansion of 1/6 in M
20.326 * [backup-simplify]: Simplify 1/6 into 1/6
20.326 * [taylor]: Taking taylor expansion of (log l) in M
20.326 * [taylor]: Taking taylor expansion of l in M
20.326 * [backup-simplify]: Simplify l into l
20.327 * [backup-simplify]: Simplify (log l) into (log l)
20.327 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.327 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.327 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.327 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.327 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.327 * [taylor]: Taking taylor expansion of 1/3 in M
20.327 * [backup-simplify]: Simplify 1/3 into 1/3
20.327 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.327 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.327 * [taylor]: Taking taylor expansion of d in M
20.327 * [backup-simplify]: Simplify d into d
20.327 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.327 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.327 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.327 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.327 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.328 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
20.328 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.328 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.329 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.329 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
20.329 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
20.329 * [taylor]: Taking taylor expansion of +nan.0 in D
20.329 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.329 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
20.329 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.329 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.329 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.329 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.329 * [taylor]: Taking taylor expansion of D in D
20.329 * [backup-simplify]: Simplify 0 into 0
20.329 * [backup-simplify]: Simplify 1 into 1
20.330 * [backup-simplify]: Simplify (* 1 1) into 1
20.330 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.330 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
20.330 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
20.330 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
20.330 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
20.330 * [taylor]: Taking taylor expansion of 1/6 in D
20.330 * [backup-simplify]: Simplify 1/6 into 1/6
20.330 * [taylor]: Taking taylor expansion of (log l) in D
20.330 * [taylor]: Taking taylor expansion of l in D
20.330 * [backup-simplify]: Simplify l into l
20.330 * [backup-simplify]: Simplify (log l) into (log l)
20.330 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
20.331 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
20.331 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.331 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.331 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.331 * [taylor]: Taking taylor expansion of 1/3 in D
20.331 * [backup-simplify]: Simplify 1/3 into 1/3
20.331 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.331 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.331 * [taylor]: Taking taylor expansion of d in D
20.331 * [backup-simplify]: Simplify d into d
20.331 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.331 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.331 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.331 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.331 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.331 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
20.332 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
20.332 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
20.332 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.333 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
20.338 * [backup-simplify]: Simplify (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (/ 1 (- l)) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (pow (* (/ 1 (/ 1 (- D))) (* (/ 1 (/ 1 (- M))) (* (/ 1 (- h)) (* 1 1)))) 2)) (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (/ 1 (- l)) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (* (pow (/ 1 (- D)) -2) (* (pow (/ 1 (- M)) -2) (* (/ 1 (- h)) (* 1 1))))) (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (/ 1 (- l)) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (pow (* (/ 1 (/ 1 (- D))) (* (/ 1 (/ 1 (- M))) (* 1 (* 1 1)))) 2)))) into (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 l) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 l) 1/6)))))))))
20.339 * * * * [progress]: [ 4 / 4 ] generating series at (2 2)
20.339 * [backup-simplify]: Simplify (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)) into (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
20.339 * [approximate]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in (d l h M D) around 0
20.340 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in D
20.340 * [taylor]: Taking taylor expansion of 1/8 in D
20.340 * [backup-simplify]: Simplify 1/8 into 1/8
20.340 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in D
20.340 * [taylor]: Taking taylor expansion of (sqrt h) in D
20.340 * [taylor]: Taking taylor expansion of h in D
20.340 * [backup-simplify]: Simplify h into h
20.340 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
20.340 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
20.340 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in D
20.340 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in D
20.340 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in D
20.340 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.340 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in D
20.340 * [taylor]: Taking taylor expansion of (pow M 2) in D
20.340 * [taylor]: Taking taylor expansion of M in D
20.340 * [backup-simplify]: Simplify M into M
20.340 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.340 * [taylor]: Taking taylor expansion of D in D
20.340 * [backup-simplify]: Simplify 0 into 0
20.340 * [backup-simplify]: Simplify 1 into 1
20.340 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in D
20.340 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in D
20.340 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in D
20.340 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in D
20.340 * [taylor]: Taking taylor expansion of 1/6 in D
20.340 * [backup-simplify]: Simplify 1/6 into 1/6
20.340 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in D
20.340 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in D
20.340 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.340 * [taylor]: Taking taylor expansion of l in D
20.340 * [backup-simplify]: Simplify l into l
20.340 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.340 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.340 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.340 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.340 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
20.341 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
20.341 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
20.341 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
20.341 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in D
20.341 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in D
20.341 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in D
20.341 * [taylor]: Taking taylor expansion of 1/3 in D
20.341 * [backup-simplify]: Simplify 1/3 into 1/3
20.341 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in D
20.341 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in D
20.341 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.341 * [taylor]: Taking taylor expansion of d in D
20.341 * [backup-simplify]: Simplify d into d
20.341 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.341 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.341 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
20.341 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
20.341 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
20.341 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
20.341 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in M
20.341 * [taylor]: Taking taylor expansion of 1/8 in M
20.341 * [backup-simplify]: Simplify 1/8 into 1/8
20.341 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in M
20.341 * [taylor]: Taking taylor expansion of (sqrt h) in M
20.341 * [taylor]: Taking taylor expansion of h in M
20.341 * [backup-simplify]: Simplify h into h
20.341 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
20.341 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
20.341 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in M
20.341 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in M
20.341 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in M
20.342 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.342 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
20.342 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.342 * [taylor]: Taking taylor expansion of M in M
20.342 * [backup-simplify]: Simplify 0 into 0
20.342 * [backup-simplify]: Simplify 1 into 1
20.342 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.342 * [taylor]: Taking taylor expansion of D in M
20.342 * [backup-simplify]: Simplify D into D
20.342 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in M
20.342 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in M
20.342 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in M
20.342 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in M
20.342 * [taylor]: Taking taylor expansion of 1/6 in M
20.342 * [backup-simplify]: Simplify 1/6 into 1/6
20.342 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in M
20.342 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in M
20.342 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.342 * [taylor]: Taking taylor expansion of l in M
20.342 * [backup-simplify]: Simplify l into l
20.342 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.342 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.342 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.342 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.342 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
20.342 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
20.342 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
20.342 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
20.342 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in M
20.342 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in M
20.342 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in M
20.342 * [taylor]: Taking taylor expansion of 1/3 in M
20.343 * [backup-simplify]: Simplify 1/3 into 1/3
20.343 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in M
20.343 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in M
20.343 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.343 * [taylor]: Taking taylor expansion of d in M
20.343 * [backup-simplify]: Simplify d into d
20.343 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.343 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.343 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
20.343 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
20.343 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
20.343 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
20.343 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in h
20.343 * [taylor]: Taking taylor expansion of 1/8 in h
20.343 * [backup-simplify]: Simplify 1/8 into 1/8
20.343 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in h
20.343 * [taylor]: Taking taylor expansion of (sqrt h) in h
20.343 * [taylor]: Taking taylor expansion of h in h
20.343 * [backup-simplify]: Simplify 0 into 0
20.343 * [backup-simplify]: Simplify 1 into 1
20.343 * [backup-simplify]: Simplify (sqrt 0) into 0
20.345 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
20.345 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in h
20.345 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in h
20.345 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in h
20.345 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.345 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in h
20.345 * [taylor]: Taking taylor expansion of (pow M 2) in h
20.345 * [taylor]: Taking taylor expansion of M in h
20.345 * [backup-simplify]: Simplify M into M
20.345 * [taylor]: Taking taylor expansion of (pow D 2) in h
20.345 * [taylor]: Taking taylor expansion of D in h
20.345 * [backup-simplify]: Simplify D into D
20.345 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in h
20.345 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in h
20.345 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in h
20.345 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in h
20.345 * [taylor]: Taking taylor expansion of 1/6 in h
20.345 * [backup-simplify]: Simplify 1/6 into 1/6
20.345 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in h
20.345 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in h
20.345 * [taylor]: Taking taylor expansion of (pow l 7) in h
20.345 * [taylor]: Taking taylor expansion of l in h
20.345 * [backup-simplify]: Simplify l into l
20.345 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.345 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.345 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.345 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.345 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
20.345 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
20.345 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
20.345 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
20.345 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in h
20.345 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in h
20.345 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in h
20.345 * [taylor]: Taking taylor expansion of 1/3 in h
20.345 * [backup-simplify]: Simplify 1/3 into 1/3
20.345 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in h
20.345 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in h
20.346 * [taylor]: Taking taylor expansion of (pow d 4) in h
20.346 * [taylor]: Taking taylor expansion of d in h
20.346 * [backup-simplify]: Simplify d into d
20.346 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.346 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.346 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
20.346 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
20.346 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
20.346 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
20.346 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in l
20.346 * [taylor]: Taking taylor expansion of 1/8 in l
20.346 * [backup-simplify]: Simplify 1/8 into 1/8
20.346 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in l
20.346 * [taylor]: Taking taylor expansion of (sqrt h) in l
20.346 * [taylor]: Taking taylor expansion of h in l
20.346 * [backup-simplify]: Simplify h into h
20.346 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
20.346 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
20.346 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in l
20.346 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in l
20.346 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in l
20.346 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.346 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
20.346 * [taylor]: Taking taylor expansion of (pow M 2) in l
20.346 * [taylor]: Taking taylor expansion of M in l
20.346 * [backup-simplify]: Simplify M into M
20.346 * [taylor]: Taking taylor expansion of (pow D 2) in l
20.346 * [taylor]: Taking taylor expansion of D in l
20.346 * [backup-simplify]: Simplify D into D
20.346 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in l
20.346 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in l
20.346 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in l
20.346 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in l
20.346 * [taylor]: Taking taylor expansion of 1/6 in l
20.346 * [backup-simplify]: Simplify 1/6 into 1/6
20.346 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in l
20.346 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in l
20.346 * [taylor]: Taking taylor expansion of (pow l 7) in l
20.346 * [taylor]: Taking taylor expansion of l in l
20.346 * [backup-simplify]: Simplify 0 into 0
20.346 * [backup-simplify]: Simplify 1 into 1
20.347 * [backup-simplify]: Simplify (* 1 1) into 1
20.347 * [backup-simplify]: Simplify (* 1 1) into 1
20.347 * [backup-simplify]: Simplify (* 1 1) into 1
20.348 * [backup-simplify]: Simplify (* 1 1) into 1
20.348 * [backup-simplify]: Simplify (/ 1 1) into 1
20.348 * [backup-simplify]: Simplify (log 1) into 0
20.348 * [backup-simplify]: Simplify (+ (* (- 7) (log l)) 0) into (- (* 7 (log l)))
20.349 * [backup-simplify]: Simplify (* 1/6 (- (* 7 (log l)))) into (* -7/6 (log l))
20.349 * [backup-simplify]: Simplify (exp (* -7/6 (log l))) into (pow l -7/6)
20.349 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in l
20.349 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in l
20.349 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in l
20.349 * [taylor]: Taking taylor expansion of 1/3 in l
20.349 * [backup-simplify]: Simplify 1/3 into 1/3
20.349 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in l
20.349 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in l
20.349 * [taylor]: Taking taylor expansion of (pow d 4) in l
20.349 * [taylor]: Taking taylor expansion of d in l
20.349 * [backup-simplify]: Simplify d into d
20.349 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.349 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.349 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
20.349 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
20.349 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
20.349 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
20.349 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in d
20.349 * [taylor]: Taking taylor expansion of 1/8 in d
20.349 * [backup-simplify]: Simplify 1/8 into 1/8
20.349 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in d
20.349 * [taylor]: Taking taylor expansion of (sqrt h) in d
20.349 * [taylor]: Taking taylor expansion of h in d
20.349 * [backup-simplify]: Simplify h into h
20.349 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
20.349 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
20.349 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in d
20.349 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in d
20.349 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in d
20.349 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.349 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
20.349 * [taylor]: Taking taylor expansion of (pow M 2) in d
20.350 * [taylor]: Taking taylor expansion of M in d
20.350 * [backup-simplify]: Simplify M into M
20.350 * [taylor]: Taking taylor expansion of (pow D 2) in d
20.350 * [taylor]: Taking taylor expansion of D in d
20.350 * [backup-simplify]: Simplify D into D
20.350 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in d
20.350 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in d
20.350 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in d
20.350 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in d
20.350 * [taylor]: Taking taylor expansion of 1/6 in d
20.350 * [backup-simplify]: Simplify 1/6 into 1/6
20.350 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in d
20.350 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in d
20.350 * [taylor]: Taking taylor expansion of (pow l 7) in d
20.350 * [taylor]: Taking taylor expansion of l in d
20.350 * [backup-simplify]: Simplify l into l
20.350 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.350 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.350 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.350 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.350 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
20.350 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
20.350 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
20.350 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
20.350 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in d
20.350 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in d
20.350 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in d
20.350 * [taylor]: Taking taylor expansion of 1/3 in d
20.350 * [backup-simplify]: Simplify 1/3 into 1/3
20.350 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in d
20.350 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in d
20.350 * [taylor]: Taking taylor expansion of (pow d 4) in d
20.350 * [taylor]: Taking taylor expansion of d in d
20.350 * [backup-simplify]: Simplify 0 into 0
20.350 * [backup-simplify]: Simplify 1 into 1
20.351 * [backup-simplify]: Simplify (* 1 1) into 1
20.351 * [backup-simplify]: Simplify (* 1 1) into 1
20.351 * [backup-simplify]: Simplify (/ 1 1) into 1
20.351 * [backup-simplify]: Simplify (log 1) into 0
20.352 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
20.352 * [backup-simplify]: Simplify (* 1/3 (- (* 4 (log d)))) into (* -4/3 (log d))
20.352 * [backup-simplify]: Simplify (exp (* -4/3 (log d))) into (pow d -4/3)
20.352 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in d
20.352 * [taylor]: Taking taylor expansion of 1/8 in d
20.352 * [backup-simplify]: Simplify 1/8 into 1/8
20.352 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in d
20.352 * [taylor]: Taking taylor expansion of (sqrt h) in d
20.352 * [taylor]: Taking taylor expansion of h in d
20.352 * [backup-simplify]: Simplify h into h
20.352 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
20.352 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
20.352 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in d
20.352 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in d
20.352 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in d
20.352 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.352 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
20.352 * [taylor]: Taking taylor expansion of (pow M 2) in d
20.352 * [taylor]: Taking taylor expansion of M in d
20.352 * [backup-simplify]: Simplify M into M
20.352 * [taylor]: Taking taylor expansion of (pow D 2) in d
20.352 * [taylor]: Taking taylor expansion of D in d
20.352 * [backup-simplify]: Simplify D into D
20.352 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in d
20.352 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in d
20.352 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in d
20.352 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in d
20.352 * [taylor]: Taking taylor expansion of 1/6 in d
20.352 * [backup-simplify]: Simplify 1/6 into 1/6
20.352 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in d
20.352 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in d
20.352 * [taylor]: Taking taylor expansion of (pow l 7) in d
20.352 * [taylor]: Taking taylor expansion of l in d
20.352 * [backup-simplify]: Simplify l into l
20.352 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.353 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.353 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.353 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.353 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
20.353 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
20.353 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
20.353 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
20.353 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in d
20.353 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in d
20.353 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in d
20.353 * [taylor]: Taking taylor expansion of 1/3 in d
20.353 * [backup-simplify]: Simplify 1/3 into 1/3
20.353 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in d
20.353 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in d
20.353 * [taylor]: Taking taylor expansion of (pow d 4) in d
20.353 * [taylor]: Taking taylor expansion of d in d
20.353 * [backup-simplify]: Simplify 0 into 0
20.353 * [backup-simplify]: Simplify 1 into 1
20.353 * [backup-simplify]: Simplify (* 1 1) into 1
20.354 * [backup-simplify]: Simplify (* 1 1) into 1
20.354 * [backup-simplify]: Simplify (/ 1 1) into 1
20.354 * [backup-simplify]: Simplify (log 1) into 0
20.354 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
20.354 * [backup-simplify]: Simplify (* 1/3 (- (* 4 (log d)))) into (* -4/3 (log d))
20.354 * [backup-simplify]: Simplify (exp (* -4/3 (log d))) into (pow d -4/3)
20.355 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.355 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.355 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
20.355 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
20.355 * [backup-simplify]: Simplify (* (pow (/ 1 (pow l 7)) 1/6) (pow d -4/3)) into (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))
20.355 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))
20.355 * [backup-simplify]: Simplify (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))) into (* (pow (/ 1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))
20.356 * [backup-simplify]: Simplify (* 1/8 (* (pow (/ 1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) into (* 1/8 (* (pow (/ 1 (pow l 7)) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))))
20.356 * [taylor]: Taking taylor expansion of (* 1/8 (* (pow (/ 1 (pow l 7)) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))) in l
20.356 * [taylor]: Taking taylor expansion of 1/8 in l
20.356 * [backup-simplify]: Simplify 1/8 into 1/8
20.356 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))) in l
20.356 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in l
20.356 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in l
20.356 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in l
20.356 * [taylor]: Taking taylor expansion of 1/6 in l
20.356 * [backup-simplify]: Simplify 1/6 into 1/6
20.356 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in l
20.356 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in l
20.356 * [taylor]: Taking taylor expansion of (pow l 7) in l
20.356 * [taylor]: Taking taylor expansion of l in l
20.356 * [backup-simplify]: Simplify 0 into 0
20.356 * [backup-simplify]: Simplify 1 into 1
20.356 * [backup-simplify]: Simplify (* 1 1) into 1
20.357 * [backup-simplify]: Simplify (* 1 1) into 1
20.357 * [backup-simplify]: Simplify (* 1 1) into 1
20.357 * [backup-simplify]: Simplify (* 1 1) into 1
20.357 * [backup-simplify]: Simplify (/ 1 1) into 1
20.358 * [backup-simplify]: Simplify (log 1) into 0
20.358 * [backup-simplify]: Simplify (+ (* (- 7) (log l)) 0) into (- (* 7 (log l)))
20.358 * [backup-simplify]: Simplify (* 1/6 (- (* 7 (log l)))) into (* -7/6 (log l))
20.358 * [backup-simplify]: Simplify (exp (* -7/6 (log l))) into (pow l -7/6)
20.358 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))) in l
20.358 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in l
20.358 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in l
20.358 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.358 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
20.358 * [taylor]: Taking taylor expansion of (pow M 2) in l
20.358 * [taylor]: Taking taylor expansion of M in l
20.358 * [backup-simplify]: Simplify M into M
20.358 * [taylor]: Taking taylor expansion of (pow D 2) in l
20.358 * [taylor]: Taking taylor expansion of D in l
20.358 * [backup-simplify]: Simplify D into D
20.358 * [taylor]: Taking taylor expansion of (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)) in l
20.358 * [taylor]: Taking taylor expansion of (sqrt h) in l
20.358 * [taylor]: Taking taylor expansion of h in l
20.358 * [backup-simplify]: Simplify h into h
20.358 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
20.358 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
20.358 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in l
20.358 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in l
20.359 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in l
20.359 * [taylor]: Taking taylor expansion of 1/3 in l
20.359 * [backup-simplify]: Simplify 1/3 into 1/3
20.359 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in l
20.359 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in l
20.359 * [taylor]: Taking taylor expansion of (pow d 4) in l
20.359 * [taylor]: Taking taylor expansion of d in l
20.359 * [backup-simplify]: Simplify d into d
20.359 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.359 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.359 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
20.359 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
20.359 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
20.359 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
20.359 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.359 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.359 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
20.359 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
20.359 * [backup-simplify]: Simplify (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)) into (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))
20.360 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))
20.360 * [backup-simplify]: Simplify (* (pow l -7/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) into (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))
20.360 * [backup-simplify]: Simplify (* 1/8 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))) into (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
20.360 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in h
20.360 * [taylor]: Taking taylor expansion of 1/8 in h
20.360 * [backup-simplify]: Simplify 1/8 into 1/8
20.360 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in h
20.360 * [taylor]: Taking taylor expansion of (sqrt h) in h
20.360 * [taylor]: Taking taylor expansion of h in h
20.360 * [backup-simplify]: Simplify 0 into 0
20.360 * [backup-simplify]: Simplify 1 into 1
20.361 * [backup-simplify]: Simplify (sqrt 0) into 0
20.362 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
20.362 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in h
20.362 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in h
20.362 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in h
20.362 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.362 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in h
20.362 * [taylor]: Taking taylor expansion of (pow M 2) in h
20.362 * [taylor]: Taking taylor expansion of M in h
20.362 * [backup-simplify]: Simplify M into M
20.362 * [taylor]: Taking taylor expansion of (pow D 2) in h
20.362 * [taylor]: Taking taylor expansion of D in h
20.362 * [backup-simplify]: Simplify D into D
20.362 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in h
20.362 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in h
20.362 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in h
20.362 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in h
20.362 * [taylor]: Taking taylor expansion of 1/6 in h
20.362 * [backup-simplify]: Simplify 1/6 into 1/6
20.362 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in h
20.362 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in h
20.362 * [taylor]: Taking taylor expansion of (pow l 7) in h
20.362 * [taylor]: Taking taylor expansion of l in h
20.362 * [backup-simplify]: Simplify l into l
20.362 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.362 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.362 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.362 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.362 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
20.362 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
20.362 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
20.362 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
20.363 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in h
20.363 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in h
20.363 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in h
20.363 * [taylor]: Taking taylor expansion of 1/3 in h
20.363 * [backup-simplify]: Simplify 1/3 into 1/3
20.363 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in h
20.363 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in h
20.363 * [taylor]: Taking taylor expansion of (pow d 4) in h
20.363 * [taylor]: Taking taylor expansion of d in h
20.363 * [backup-simplify]: Simplify d into d
20.363 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.363 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.363 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
20.363 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
20.363 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
20.363 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
20.363 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.363 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.363 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
20.363 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
20.363 * [backup-simplify]: Simplify (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) into (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))
20.364 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))
20.364 * [backup-simplify]: Simplify (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))) into 0
20.364 * [backup-simplify]: Simplify (* 1/8 0) into 0
20.364 * [taylor]: Taking taylor expansion of 0 in M
20.364 * [backup-simplify]: Simplify 0 into 0
20.364 * [taylor]: Taking taylor expansion of 0 in D
20.364 * [backup-simplify]: Simplify 0 into 0
20.364 * [backup-simplify]: Simplify 0 into 0
20.365 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.365 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.366 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
20.367 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
20.367 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
20.367 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (- (* 4 (log d))))) into 0
20.368 * [backup-simplify]: Simplify (* (exp (* -4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
20.368 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.368 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.368 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.368 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.368 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow l 7)) (/ 0 (pow l 7))))) into 0
20.369 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow l 7)) 1)))) 1) into 0
20.369 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (/ 1 (pow l 7))))) into 0
20.370 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 (pow l 7))))) (+ (* (/ (pow 0 1) 1)))) into 0
20.370 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow l 7)) 1/6) 0) (* 0 (pow d -4/3))) into 0
20.370 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.370 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.370 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
20.370 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (* 0 (* (pow M 2) (pow D 2)))) into 0
20.371 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into 0
20.371 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))) into 0
20.372 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))))) into 0
20.372 * [taylor]: Taking taylor expansion of 0 in l
20.372 * [backup-simplify]: Simplify 0 into 0
20.372 * [taylor]: Taking taylor expansion of 0 in h
20.372 * [backup-simplify]: Simplify 0 into 0
20.372 * [taylor]: Taking taylor expansion of 0 in M
20.372 * [backup-simplify]: Simplify 0 into 0
20.372 * [taylor]: Taking taylor expansion of 0 in D
20.372 * [backup-simplify]: Simplify 0 into 0
20.372 * [backup-simplify]: Simplify 0 into 0
20.372 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.372 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.372 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))))) into 0
20.373 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 1) into 0
20.373 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (/ 1 (pow d 4))))) into 0
20.373 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 1) 1)))) into 0
20.374 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (* 0 (pow (/ 1 (pow d 4)) 1/3))) into 0
20.374 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.374 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.374 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
20.374 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (* 0 (* (pow M 2) (pow D 2)))) into 0
20.374 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))) into 0
20.375 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.375 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.375 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.376 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.376 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
20.377 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
20.377 * [backup-simplify]: Simplify (+ (* (- 7) (log l)) 0) into (- (* 7 (log l)))
20.378 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (- (* 7 (log l))))) into 0
20.378 * [backup-simplify]: Simplify (* (exp (* -7/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.378 * [backup-simplify]: Simplify (+ (* (pow l -7/6) 0) (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) into 0
20.379 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))) into 0
20.379 * [taylor]: Taking taylor expansion of 0 in h
20.379 * [backup-simplify]: Simplify 0 into 0
20.379 * [taylor]: Taking taylor expansion of 0 in M
20.379 * [backup-simplify]: Simplify 0 into 0
20.379 * [taylor]: Taking taylor expansion of 0 in D
20.379 * [backup-simplify]: Simplify 0 into 0
20.379 * [backup-simplify]: Simplify 0 into 0
20.379 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.379 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.380 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))))) into 0
20.380 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 1) into 0
20.380 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (/ 1 (pow d 4))))) into 0
20.381 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 1) 1)))) into 0
20.381 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.381 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.381 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.381 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.381 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow l 7)) (/ 0 (pow l 7))))) into 0
20.382 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow l 7)) 1)))) 1) into 0
20.382 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (/ 1 (pow l 7))))) into 0
20.383 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 (pow l 7))))) (+ (* (/ (pow 0 1) 1)))) into 0
20.383 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow l 7)) 1/6) 0) (* 0 (pow (/ 1 (pow d 4)) 1/3))) into 0
20.383 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.383 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.383 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
20.383 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (* 0 (* (pow M 2) (pow D 2)))) into 0
20.383 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into 0
20.384 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))) into (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))
20.389 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))) (* 0 0)) into (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
20.389 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in M
20.389 * [taylor]: Taking taylor expansion of (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in M
20.389 * [taylor]: Taking taylor expansion of +nan.0 in M
20.389 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.389 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in M
20.389 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in M
20.389 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in M
20.389 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.389 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
20.389 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.389 * [taylor]: Taking taylor expansion of M in M
20.389 * [backup-simplify]: Simplify 0 into 0
20.389 * [backup-simplify]: Simplify 1 into 1
20.389 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.389 * [taylor]: Taking taylor expansion of D in M
20.389 * [backup-simplify]: Simplify D into D
20.389 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in M
20.389 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in M
20.389 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in M
20.389 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in M
20.389 * [taylor]: Taking taylor expansion of 1/6 in M
20.389 * [backup-simplify]: Simplify 1/6 into 1/6
20.389 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in M
20.389 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in M
20.389 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.389 * [taylor]: Taking taylor expansion of l in M
20.389 * [backup-simplify]: Simplify l into l
20.389 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.390 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.390 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.390 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.390 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
20.390 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
20.390 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
20.390 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
20.390 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in M
20.390 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in M
20.390 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in M
20.390 * [taylor]: Taking taylor expansion of 1/3 in M
20.390 * [backup-simplify]: Simplify 1/3 into 1/3
20.390 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in M
20.390 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in M
20.390 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.390 * [taylor]: Taking taylor expansion of d in M
20.390 * [backup-simplify]: Simplify d into d
20.390 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.390 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.390 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
20.390 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
20.390 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
20.390 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
20.391 * [backup-simplify]: Simplify (* 1 1) into 1
20.391 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.391 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
20.391 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (pow D 2)) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
20.391 * [backup-simplify]: Simplify (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) into (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))
20.392 * [backup-simplify]: Simplify (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)))
20.392 * [backup-simplify]: Simplify (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)))) into (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6))))
20.392 * [backup-simplify]: Simplify (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6))))) into (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)))))
20.393 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6))))) in D
20.393 * [taylor]: Taking taylor expansion of (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)))) in D
20.393 * [taylor]: Taking taylor expansion of +nan.0 in D
20.393 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.393 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6))) in D
20.393 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in D
20.393 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in D
20.393 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in D
20.393 * [taylor]: Taking taylor expansion of 1/3 in D
20.393 * [backup-simplify]: Simplify 1/3 into 1/3
20.393 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in D
20.393 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in D
20.393 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.393 * [taylor]: Taking taylor expansion of d in D
20.393 * [backup-simplify]: Simplify d into d
20.393 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.393 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.393 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
20.393 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
20.393 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
20.393 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
20.393 * [taylor]: Taking taylor expansion of (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)) in D
20.393 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in D
20.393 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.393 * [taylor]: Taking taylor expansion of D in D
20.393 * [backup-simplify]: Simplify 0 into 0
20.393 * [backup-simplify]: Simplify 1 into 1
20.393 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in D
20.393 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
20.393 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in D
20.393 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in D
20.393 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in D
20.393 * [taylor]: Taking taylor expansion of 1/6 in D
20.393 * [backup-simplify]: Simplify 1/6 into 1/6
20.393 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in D
20.393 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in D
20.393 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.393 * [taylor]: Taking taylor expansion of l in D
20.393 * [backup-simplify]: Simplify l into l
20.393 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.394 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.394 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.394 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.394 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
20.394 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
20.394 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
20.394 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
20.394 * [backup-simplify]: Simplify (* 1 1) into 1
20.394 * [backup-simplify]: Simplify (* 1 (fabs (pow (/ d l) 1/3))) into (fabs (pow (/ d l) 1/3))
20.394 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (pow (/ 1 (pow l 7)) 1/6)) into (* (pow (/ 1 (pow l 7)) 1/6) (fabs (pow (/ d l) 1/3)))
20.395 * [backup-simplify]: Simplify (* (pow (/ 1 (pow d 4)) 1/3) (* (pow (/ 1 (pow l 7)) 1/6) (fabs (pow (/ d l) 1/3)))) into (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))
20.395 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))
20.395 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
20.395 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
20.396 * [taylor]: Taking taylor expansion of 0 in D
20.396 * [backup-simplify]: Simplify 0 into 0
20.396 * [backup-simplify]: Simplify 0 into 0
20.396 * [backup-simplify]: Simplify 0 into 0
20.396 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.397 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.397 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
20.399 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
20.399 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
20.400 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (- (* 4 (log d)))))) into 0
20.401 * [backup-simplify]: Simplify (* (exp (* -4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.402 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
20.402 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
20.403 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
20.403 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
20.404 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow l 7)) (/ 0 (pow l 7))) (* 0 (/ 0 (pow l 7))))) into 0
20.405 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (/ 1 (pow l 7)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (/ 1 (pow l 7)) 1)))) 2) into 0
20.406 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (/ 1 (pow l 7)))))) into 0
20.408 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 (pow l 7))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.408 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow l 7)) 1/6) 0) (+ (* 0 0) (* 0 (pow d -4/3)))) into 0
20.409 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.409 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.410 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
20.411 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (+ (* 0 0) (* 0 (* (pow M 2) (pow D 2))))) into 0
20.412 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (+ (* 0 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into 0
20.413 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt h))) into 0
20.414 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (+ (* 0 0) (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))) into 0
20.415 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))))) into 0
20.415 * [taylor]: Taking taylor expansion of 0 in l
20.415 * [backup-simplify]: Simplify 0 into 0
20.415 * [taylor]: Taking taylor expansion of 0 in h
20.415 * [backup-simplify]: Simplify 0 into 0
20.415 * [taylor]: Taking taylor expansion of 0 in M
20.415 * [backup-simplify]: Simplify 0 into 0
20.416 * [taylor]: Taking taylor expansion of 0 in D
20.416 * [backup-simplify]: Simplify 0 into 0
20.416 * [backup-simplify]: Simplify 0 into 0
20.416 * [taylor]: Taking taylor expansion of 0 in h
20.416 * [backup-simplify]: Simplify 0 into 0
20.416 * [taylor]: Taking taylor expansion of 0 in M
20.416 * [backup-simplify]: Simplify 0 into 0
20.416 * [taylor]: Taking taylor expansion of 0 in D
20.416 * [backup-simplify]: Simplify 0 into 0
20.416 * [backup-simplify]: Simplify 0 into 0
20.416 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
20.417 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
20.417 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))) (* 0 (/ 0 (pow d 4))))) into 0
20.419 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (/ 1 (pow d 4)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 2) into 0
20.420 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (/ 1 (pow d 4)))))) into 0
20.421 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.422 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt h))) into 0
20.422 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (+ (* 0 0) (* 0 (pow (/ 1 (pow d 4)) 1/3)))) into 0
20.423 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.423 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.424 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
20.425 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (+ (* 0 0) (* 0 (* (pow M 2) (pow D 2))))) into 0
20.425 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (+ (* 0 0) (* 0 (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))) into 0
20.426 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.427 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.428 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.429 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.430 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
20.433 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
20.433 * [backup-simplify]: Simplify (+ (* (- 7) (log l)) 0) into (- (* 7 (log l)))
20.434 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (- (* 7 (log l)))))) into 0
20.436 * [backup-simplify]: Simplify (* (exp (* -7/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.437 * [backup-simplify]: Simplify (+ (* (pow l -7/6) 0) (+ (* 0 0) (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))))) into 0
20.438 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))))) into 0
20.438 * [taylor]: Taking taylor expansion of 0 in h
20.438 * [backup-simplify]: Simplify 0 into 0
20.438 * [taylor]: Taking taylor expansion of 0 in M
20.438 * [backup-simplify]: Simplify 0 into 0
20.438 * [taylor]: Taking taylor expansion of 0 in D
20.438 * [backup-simplify]: Simplify 0 into 0
20.438 * [backup-simplify]: Simplify 0 into 0
20.438 * [taylor]: Taking taylor expansion of 0 in M
20.439 * [backup-simplify]: Simplify 0 into 0
20.439 * [taylor]: Taking taylor expansion of 0 in D
20.439 * [backup-simplify]: Simplify 0 into 0
20.439 * [backup-simplify]: Simplify 0 into 0
20.440 * [backup-simplify]: Simplify (* (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) (* (pow D 2) (* (pow M 2) (* h (* 1 1))))) into (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 (pow l 7)) 1/6))))
20.441 * [backup-simplify]: Simplify (/ (* (* (* (fabs (/ (cbrt (/ 1 d)) (cbrt (/ 1 l)))) (sqrt (/ (cbrt (/ 1 d)) (cbrt (/ 1 l))))) (sqrt (/ (/ 1 d) (/ 1 h)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (/ 1 h)))) (* (/ 1 l) 2)) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.441 * [approximate]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in (d l h M D) around 0
20.441 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
20.441 * [taylor]: Taking taylor expansion of 1/8 in D
20.441 * [backup-simplify]: Simplify 1/8 into 1/8
20.441 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
20.441 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in D
20.441 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.441 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.441 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in D
20.441 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.441 * [taylor]: Taking taylor expansion of D in D
20.441 * [backup-simplify]: Simplify 0 into 0
20.441 * [backup-simplify]: Simplify 1 into 1
20.441 * [taylor]: Taking taylor expansion of (pow M 2) in D
20.441 * [taylor]: Taking taylor expansion of M in D
20.441 * [backup-simplify]: Simplify M into M
20.442 * [backup-simplify]: Simplify (* 1 1) into 1
20.442 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.442 * [backup-simplify]: Simplify (* 1 (pow M 2)) into (pow M 2)
20.442 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow M 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow M 2))
20.443 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
20.443 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in D
20.443 * [taylor]: Taking taylor expansion of (/ 1 h) in D
20.443 * [taylor]: Taking taylor expansion of h in D
20.443 * [backup-simplify]: Simplify h into h
20.443 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.443 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.443 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.443 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.443 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
20.443 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
20.443 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
20.443 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
20.443 * [taylor]: Taking taylor expansion of 1/6 in D
20.443 * [backup-simplify]: Simplify 1/6 into 1/6
20.443 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
20.443 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.443 * [taylor]: Taking taylor expansion of l in D
20.443 * [backup-simplify]: Simplify l into l
20.443 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.443 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.443 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.444 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.444 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.444 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.444 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.444 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.444 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.444 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.444 * [taylor]: Taking taylor expansion of 1/3 in D
20.444 * [backup-simplify]: Simplify 1/3 into 1/3
20.444 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.444 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.444 * [taylor]: Taking taylor expansion of d in D
20.444 * [backup-simplify]: Simplify d into d
20.444 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.444 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.444 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.444 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.445 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.445 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
20.445 * [taylor]: Taking taylor expansion of 1/8 in M
20.445 * [backup-simplify]: Simplify 1/8 into 1/8
20.445 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
20.445 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.445 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.445 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.445 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.445 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.445 * [taylor]: Taking taylor expansion of D in M
20.445 * [backup-simplify]: Simplify D into D
20.445 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.445 * [taylor]: Taking taylor expansion of M in M
20.445 * [backup-simplify]: Simplify 0 into 0
20.445 * [backup-simplify]: Simplify 1 into 1
20.445 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.446 * [backup-simplify]: Simplify (* 1 1) into 1
20.446 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.446 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.446 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
20.446 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in M
20.446 * [taylor]: Taking taylor expansion of (/ 1 h) in M
20.446 * [taylor]: Taking taylor expansion of h in M
20.446 * [backup-simplify]: Simplify h into h
20.446 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.446 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.446 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.446 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.446 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
20.446 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
20.446 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
20.446 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
20.446 * [taylor]: Taking taylor expansion of 1/6 in M
20.446 * [backup-simplify]: Simplify 1/6 into 1/6
20.447 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
20.447 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.447 * [taylor]: Taking taylor expansion of l in M
20.447 * [backup-simplify]: Simplify l into l
20.447 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.447 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.447 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.447 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.447 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.447 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.447 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.447 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.447 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.447 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.447 * [taylor]: Taking taylor expansion of 1/3 in M
20.447 * [backup-simplify]: Simplify 1/3 into 1/3
20.447 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.447 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.447 * [taylor]: Taking taylor expansion of d in M
20.447 * [backup-simplify]: Simplify d into d
20.447 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.448 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.448 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.448 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.448 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.448 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in h
20.448 * [taylor]: Taking taylor expansion of 1/8 in h
20.448 * [backup-simplify]: Simplify 1/8 into 1/8
20.448 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in h
20.448 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
20.448 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
20.448 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.448 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
20.448 * [taylor]: Taking taylor expansion of (pow D 2) in h
20.448 * [taylor]: Taking taylor expansion of D in h
20.448 * [backup-simplify]: Simplify D into D
20.448 * [taylor]: Taking taylor expansion of (pow M 2) in h
20.448 * [taylor]: Taking taylor expansion of M in h
20.448 * [backup-simplify]: Simplify M into M
20.448 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.448 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.449 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.449 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.449 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in h
20.449 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
20.449 * [taylor]: Taking taylor expansion of (/ 1 h) in h
20.449 * [taylor]: Taking taylor expansion of h in h
20.449 * [backup-simplify]: Simplify 0 into 0
20.449 * [backup-simplify]: Simplify 1 into 1
20.449 * [backup-simplify]: Simplify (/ 1 1) into 1
20.450 * [backup-simplify]: Simplify (sqrt 0) into 0
20.451 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
20.451 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in h
20.451 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in h
20.451 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in h
20.451 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in h
20.451 * [taylor]: Taking taylor expansion of 1/6 in h
20.451 * [backup-simplify]: Simplify 1/6 into 1/6
20.451 * [taylor]: Taking taylor expansion of (log (pow l 7)) in h
20.451 * [taylor]: Taking taylor expansion of (pow l 7) in h
20.451 * [taylor]: Taking taylor expansion of l in h
20.451 * [backup-simplify]: Simplify l into l
20.452 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.452 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.452 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.452 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.452 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.452 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.452 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.452 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
20.452 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
20.452 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
20.452 * [taylor]: Taking taylor expansion of 1/3 in h
20.452 * [backup-simplify]: Simplify 1/3 into 1/3
20.452 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
20.452 * [taylor]: Taking taylor expansion of (pow d 4) in h
20.452 * [taylor]: Taking taylor expansion of d in h
20.452 * [backup-simplify]: Simplify d into d
20.452 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.452 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.453 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.453 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.453 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.453 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in l
20.453 * [taylor]: Taking taylor expansion of 1/8 in l
20.453 * [backup-simplify]: Simplify 1/8 into 1/8
20.453 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in l
20.453 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
20.453 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
20.453 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.453 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
20.453 * [taylor]: Taking taylor expansion of (pow D 2) in l
20.453 * [taylor]: Taking taylor expansion of D in l
20.453 * [backup-simplify]: Simplify D into D
20.453 * [taylor]: Taking taylor expansion of (pow M 2) in l
20.453 * [taylor]: Taking taylor expansion of M in l
20.453 * [backup-simplify]: Simplify M into M
20.453 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.453 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.453 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.454 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.454 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in l
20.454 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
20.454 * [taylor]: Taking taylor expansion of (/ 1 h) in l
20.454 * [taylor]: Taking taylor expansion of h in l
20.454 * [backup-simplify]: Simplify h into h
20.454 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.454 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.454 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.454 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.454 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in l
20.454 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in l
20.454 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in l
20.454 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in l
20.454 * [taylor]: Taking taylor expansion of 1/6 in l
20.454 * [backup-simplify]: Simplify 1/6 into 1/6
20.454 * [taylor]: Taking taylor expansion of (log (pow l 7)) in l
20.454 * [taylor]: Taking taylor expansion of (pow l 7) in l
20.454 * [taylor]: Taking taylor expansion of l in l
20.454 * [backup-simplify]: Simplify 0 into 0
20.454 * [backup-simplify]: Simplify 1 into 1
20.455 * [backup-simplify]: Simplify (* 1 1) into 1
20.455 * [backup-simplify]: Simplify (* 1 1) into 1
20.456 * [backup-simplify]: Simplify (* 1 1) into 1
20.456 * [backup-simplify]: Simplify (* 1 1) into 1
20.456 * [backup-simplify]: Simplify (log 1) into 0
20.457 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.457 * [backup-simplify]: Simplify (* 1/6 (* 7 (log l))) into (* 7/6 (log l))
20.457 * [backup-simplify]: Simplify (exp (* 7/6 (log l))) into (pow l 7/6)
20.457 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
20.457 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
20.457 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
20.457 * [taylor]: Taking taylor expansion of 1/3 in l
20.457 * [backup-simplify]: Simplify 1/3 into 1/3
20.457 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
20.457 * [taylor]: Taking taylor expansion of (pow d 4) in l
20.457 * [taylor]: Taking taylor expansion of d in l
20.457 * [backup-simplify]: Simplify d into d
20.457 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.457 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.457 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.458 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.458 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.458 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in d
20.458 * [taylor]: Taking taylor expansion of 1/8 in d
20.458 * [backup-simplify]: Simplify 1/8 into 1/8
20.458 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in d
20.458 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
20.458 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
20.458 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.458 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
20.458 * [taylor]: Taking taylor expansion of (pow D 2) in d
20.458 * [taylor]: Taking taylor expansion of D in d
20.458 * [backup-simplify]: Simplify D into D
20.458 * [taylor]: Taking taylor expansion of (pow M 2) in d
20.458 * [taylor]: Taking taylor expansion of M in d
20.458 * [backup-simplify]: Simplify M into M
20.458 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.458 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.458 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.459 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.459 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in d
20.459 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
20.459 * [taylor]: Taking taylor expansion of (/ 1 h) in d
20.459 * [taylor]: Taking taylor expansion of h in d
20.459 * [backup-simplify]: Simplify h into h
20.459 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.459 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.459 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.459 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.459 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in d
20.459 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in d
20.459 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in d
20.459 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in d
20.459 * [taylor]: Taking taylor expansion of 1/6 in d
20.459 * [backup-simplify]: Simplify 1/6 into 1/6
20.459 * [taylor]: Taking taylor expansion of (log (pow l 7)) in d
20.459 * [taylor]: Taking taylor expansion of (pow l 7) in d
20.459 * [taylor]: Taking taylor expansion of l in d
20.459 * [backup-simplify]: Simplify l into l
20.459 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.460 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.460 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.460 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.460 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.460 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.460 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.460 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
20.460 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
20.460 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
20.460 * [taylor]: Taking taylor expansion of 1/3 in d
20.460 * [backup-simplify]: Simplify 1/3 into 1/3
20.460 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
20.460 * [taylor]: Taking taylor expansion of (pow d 4) in d
20.460 * [taylor]: Taking taylor expansion of d in d
20.460 * [backup-simplify]: Simplify 0 into 0
20.460 * [backup-simplify]: Simplify 1 into 1
20.461 * [backup-simplify]: Simplify (* 1 1) into 1
20.461 * [backup-simplify]: Simplify (* 1 1) into 1
20.461 * [backup-simplify]: Simplify (log 1) into 0
20.462 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.462 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
20.462 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
20.462 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in d
20.462 * [taylor]: Taking taylor expansion of 1/8 in d
20.462 * [backup-simplify]: Simplify 1/8 into 1/8
20.462 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in d
20.462 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
20.462 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
20.462 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.462 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
20.462 * [taylor]: Taking taylor expansion of (pow D 2) in d
20.462 * [taylor]: Taking taylor expansion of D in d
20.463 * [backup-simplify]: Simplify D into D
20.463 * [taylor]: Taking taylor expansion of (pow M 2) in d
20.463 * [taylor]: Taking taylor expansion of M in d
20.463 * [backup-simplify]: Simplify M into M
20.463 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.463 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.463 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.463 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.463 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in d
20.463 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
20.463 * [taylor]: Taking taylor expansion of (/ 1 h) in d
20.463 * [taylor]: Taking taylor expansion of h in d
20.463 * [backup-simplify]: Simplify h into h
20.463 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.463 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.463 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.464 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.464 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in d
20.464 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in d
20.464 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in d
20.464 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in d
20.464 * [taylor]: Taking taylor expansion of 1/6 in d
20.464 * [backup-simplify]: Simplify 1/6 into 1/6
20.464 * [taylor]: Taking taylor expansion of (log (pow l 7)) in d
20.464 * [taylor]: Taking taylor expansion of (pow l 7) in d
20.464 * [taylor]: Taking taylor expansion of l in d
20.464 * [backup-simplify]: Simplify l into l
20.464 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.464 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.464 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.464 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.464 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.464 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.464 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.464 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
20.464 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
20.465 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
20.465 * [taylor]: Taking taylor expansion of 1/3 in d
20.465 * [backup-simplify]: Simplify 1/3 into 1/3
20.465 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
20.465 * [taylor]: Taking taylor expansion of (pow d 4) in d
20.465 * [taylor]: Taking taylor expansion of d in d
20.465 * [backup-simplify]: Simplify 0 into 0
20.465 * [backup-simplify]: Simplify 1 into 1
20.465 * [backup-simplify]: Simplify (* 1 1) into 1
20.466 * [backup-simplify]: Simplify (* 1 1) into 1
20.466 * [backup-simplify]: Simplify (log 1) into 0
20.466 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.466 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
20.466 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
20.467 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow d 4/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.467 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))
20.467 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))
20.468 * [backup-simplify]: Simplify (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.468 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in l
20.468 * [taylor]: Taking taylor expansion of 1/8 in l
20.468 * [backup-simplify]: Simplify 1/8 into 1/8
20.468 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in l
20.468 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
20.468 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
20.468 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.468 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
20.468 * [taylor]: Taking taylor expansion of (pow D 2) in l
20.469 * [taylor]: Taking taylor expansion of D in l
20.469 * [backup-simplify]: Simplify D into D
20.469 * [taylor]: Taking taylor expansion of (pow M 2) in l
20.469 * [taylor]: Taking taylor expansion of M in l
20.469 * [backup-simplify]: Simplify M into M
20.469 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.469 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.469 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.469 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.469 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in l
20.469 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
20.469 * [taylor]: Taking taylor expansion of (/ 1 h) in l
20.469 * [taylor]: Taking taylor expansion of h in l
20.469 * [backup-simplify]: Simplify h into h
20.469 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.469 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.469 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.470 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.470 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in l
20.470 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in l
20.470 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in l
20.470 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in l
20.470 * [taylor]: Taking taylor expansion of 1/6 in l
20.470 * [backup-simplify]: Simplify 1/6 into 1/6
20.470 * [taylor]: Taking taylor expansion of (log (pow l 7)) in l
20.470 * [taylor]: Taking taylor expansion of (pow l 7) in l
20.470 * [taylor]: Taking taylor expansion of l in l
20.470 * [backup-simplify]: Simplify 0 into 0
20.470 * [backup-simplify]: Simplify 1 into 1
20.470 * [backup-simplify]: Simplify (* 1 1) into 1
20.471 * [backup-simplify]: Simplify (* 1 1) into 1
20.472 * [backup-simplify]: Simplify (* 1 1) into 1
20.472 * [backup-simplify]: Simplify (* 1 1) into 1
20.473 * [backup-simplify]: Simplify (log 1) into 0
20.473 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.473 * [backup-simplify]: Simplify (* 1/6 (* 7 (log l))) into (* 7/6 (log l))
20.473 * [backup-simplify]: Simplify (exp (* 7/6 (log l))) into (pow l 7/6)
20.473 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
20.473 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
20.473 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
20.473 * [taylor]: Taking taylor expansion of 1/3 in l
20.473 * [backup-simplify]: Simplify 1/3 into 1/3
20.473 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
20.473 * [taylor]: Taking taylor expansion of (pow d 4) in l
20.474 * [taylor]: Taking taylor expansion of d in l
20.474 * [backup-simplify]: Simplify d into d
20.474 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.474 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.474 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.474 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.474 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.474 * [backup-simplify]: Simplify (* (pow l 7/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.474 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))
20.475 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))
20.475 * [backup-simplify]: Simplify (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.476 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in h
20.476 * [taylor]: Taking taylor expansion of 1/8 in h
20.476 * [backup-simplify]: Simplify 1/8 into 1/8
20.476 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in h
20.476 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
20.476 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
20.476 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.476 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
20.476 * [taylor]: Taking taylor expansion of (pow D 2) in h
20.476 * [taylor]: Taking taylor expansion of D in h
20.476 * [backup-simplify]: Simplify D into D
20.476 * [taylor]: Taking taylor expansion of (pow M 2) in h
20.476 * [taylor]: Taking taylor expansion of M in h
20.476 * [backup-simplify]: Simplify M into M
20.476 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.476 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.476 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.477 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.477 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in h
20.477 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
20.477 * [taylor]: Taking taylor expansion of (/ 1 h) in h
20.477 * [taylor]: Taking taylor expansion of h in h
20.477 * [backup-simplify]: Simplify 0 into 0
20.477 * [backup-simplify]: Simplify 1 into 1
20.477 * [backup-simplify]: Simplify (/ 1 1) into 1
20.478 * [backup-simplify]: Simplify (sqrt 0) into 0
20.479 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
20.479 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in h
20.479 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in h
20.479 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in h
20.479 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in h
20.479 * [taylor]: Taking taylor expansion of 1/6 in h
20.479 * [backup-simplify]: Simplify 1/6 into 1/6
20.479 * [taylor]: Taking taylor expansion of (log (pow l 7)) in h
20.479 * [taylor]: Taking taylor expansion of (pow l 7) in h
20.480 * [taylor]: Taking taylor expansion of l in h
20.480 * [backup-simplify]: Simplify l into l
20.480 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.480 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.480 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.480 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.480 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.480 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.480 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.480 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
20.480 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
20.480 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
20.480 * [taylor]: Taking taylor expansion of 1/3 in h
20.480 * [backup-simplify]: Simplify 1/3 into 1/3
20.480 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
20.480 * [taylor]: Taking taylor expansion of (pow d 4) in h
20.480 * [taylor]: Taking taylor expansion of d in h
20.480 * [backup-simplify]: Simplify d into d
20.480 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.481 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.481 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.481 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.481 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.481 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.481 * [backup-simplify]: Simplify (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into 0
20.482 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) into 0
20.482 * [backup-simplify]: Simplify (* 1/8 0) into 0
20.482 * [taylor]: Taking taylor expansion of 0 in M
20.482 * [backup-simplify]: Simplify 0 into 0
20.483 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.484 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.485 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
20.486 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.486 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (* 4 (log d)))) into 0
20.487 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
20.487 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.487 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.487 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.487 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.488 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
20.489 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
20.490 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.490 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow d 4/3))) into 0
20.490 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
20.490 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.490 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.490 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.491 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.492 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
20.493 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.493 * [taylor]: Taking taylor expansion of 0 in l
20.493 * [backup-simplify]: Simplify 0 into 0
20.493 * [taylor]: Taking taylor expansion of 0 in h
20.493 * [backup-simplify]: Simplify 0 into 0
20.493 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.493 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.494 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.495 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.495 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.496 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.497 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.497 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.498 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.499 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
20.500 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.500 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (* 7 (log l)))) into 0
20.501 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.501 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.502 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
20.502 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.502 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.502 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.503 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.503 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
20.504 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.504 * [taylor]: Taking taylor expansion of 0 in h
20.504 * [backup-simplify]: Simplify 0 into 0
20.504 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.505 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.505 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.506 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.507 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.507 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.507 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.507 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.507 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.508 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
20.508 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
20.509 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.510 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.510 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.510 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.510 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.511 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.511 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.512 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.514 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.514 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
20.514 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
20.514 * [taylor]: Taking taylor expansion of +nan.0 in M
20.514 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.514 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
20.514 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.514 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.514 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.514 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.514 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.514 * [taylor]: Taking taylor expansion of D in M
20.514 * [backup-simplify]: Simplify D into D
20.514 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.514 * [taylor]: Taking taylor expansion of M in M
20.514 * [backup-simplify]: Simplify 0 into 0
20.514 * [backup-simplify]: Simplify 1 into 1
20.514 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.515 * [backup-simplify]: Simplify (* 1 1) into 1
20.515 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.515 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.515 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
20.515 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
20.515 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
20.515 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
20.515 * [taylor]: Taking taylor expansion of 1/6 in M
20.515 * [backup-simplify]: Simplify 1/6 into 1/6
20.515 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
20.515 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.515 * [taylor]: Taking taylor expansion of l in M
20.515 * [backup-simplify]: Simplify l into l
20.515 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.515 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.515 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.515 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.516 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.516 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.516 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.516 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.516 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.516 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.516 * [taylor]: Taking taylor expansion of 1/3 in M
20.516 * [backup-simplify]: Simplify 1/3 into 1/3
20.516 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.516 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.516 * [taylor]: Taking taylor expansion of d in M
20.516 * [backup-simplify]: Simplify d into d
20.516 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.516 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.516 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.516 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.516 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.517 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.517 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.517 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.518 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.518 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
20.518 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
20.518 * [taylor]: Taking taylor expansion of +nan.0 in D
20.518 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.518 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
20.518 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.518 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.518 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.518 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.518 * [taylor]: Taking taylor expansion of D in D
20.518 * [backup-simplify]: Simplify 0 into 0
20.518 * [backup-simplify]: Simplify 1 into 1
20.519 * [backup-simplify]: Simplify (* 1 1) into 1
20.519 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.519 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
20.519 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
20.519 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
20.519 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
20.519 * [taylor]: Taking taylor expansion of 1/6 in D
20.519 * [backup-simplify]: Simplify 1/6 into 1/6
20.519 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
20.519 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.519 * [taylor]: Taking taylor expansion of l in D
20.519 * [backup-simplify]: Simplify l into l
20.519 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.519 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.519 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.519 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.519 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.519 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.520 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.520 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.520 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.520 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.520 * [taylor]: Taking taylor expansion of 1/3 in D
20.520 * [backup-simplify]: Simplify 1/3 into 1/3
20.520 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.520 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.520 * [taylor]: Taking taylor expansion of d in D
20.520 * [backup-simplify]: Simplify d into d
20.520 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.520 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.520 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.520 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.520 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.520 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.521 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.521 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.521 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.522 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.523 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.524 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.526 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
20.527 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.527 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (* 4 (log d))))) into 0
20.529 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.529 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
20.529 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
20.530 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
20.530 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
20.532 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow l 7) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow l 7) 1)))) 2) into 0
20.532 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (pow l 7))))) into 0
20.533 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.533 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (* 0 (pow d 4/3)))) into 0
20.534 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.534 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
20.534 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
20.535 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.535 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.539 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.539 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.540 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.541 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
20.541 * [taylor]: Taking taylor expansion of 0 in l
20.541 * [backup-simplify]: Simplify 0 into 0
20.541 * [taylor]: Taking taylor expansion of 0 in h
20.541 * [backup-simplify]: Simplify 0 into 0
20.541 * [taylor]: Taking taylor expansion of 0 in h
20.541 * [backup-simplify]: Simplify 0 into 0
20.542 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
20.542 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
20.543 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
20.544 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
20.544 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.545 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.545 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.546 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.547 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.548 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
20.548 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.549 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (* 7 (log l))))) into 0
20.550 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.550 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
20.550 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.551 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
20.551 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
20.551 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.552 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.552 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.553 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.554 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.555 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
20.555 * [taylor]: Taking taylor expansion of 0 in h
20.555 * [backup-simplify]: Simplify 0 into 0
20.555 * [taylor]: Taking taylor expansion of 0 in M
20.555 * [backup-simplify]: Simplify 0 into 0
20.555 * [taylor]: Taking taylor expansion of 0 in M
20.555 * [backup-simplify]: Simplify 0 into 0
20.556 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
20.556 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
20.558 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
20.559 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
20.560 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.561 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
20.561 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
20.562 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
20.562 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
20.564 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow l 7) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow l 7) 1)))) 2) into 0
20.565 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (pow l 7))))) into 0
20.566 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.567 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
20.568 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
20.571 * [backup-simplify]: Simplify (/ (- 0 (pow +nan.0 2) (+)) (* 2 0)) into +nan.0
20.572 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.573 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.573 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.573 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.574 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.576 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.578 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.578 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
20.578 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
20.578 * [taylor]: Taking taylor expansion of +nan.0 in M
20.578 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.578 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
20.578 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.578 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.578 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.578 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.578 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.578 * [taylor]: Taking taylor expansion of D in M
20.578 * [backup-simplify]: Simplify D into D
20.578 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.578 * [taylor]: Taking taylor expansion of M in M
20.578 * [backup-simplify]: Simplify 0 into 0
20.578 * [backup-simplify]: Simplify 1 into 1
20.579 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.579 * [backup-simplify]: Simplify (* 1 1) into 1
20.579 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.579 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.579 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
20.579 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
20.579 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
20.579 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
20.579 * [taylor]: Taking taylor expansion of 1/6 in M
20.579 * [backup-simplify]: Simplify 1/6 into 1/6
20.579 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
20.579 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.579 * [taylor]: Taking taylor expansion of l in M
20.580 * [backup-simplify]: Simplify l into l
20.580 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.580 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.580 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.580 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.580 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.580 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.580 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.580 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.580 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.580 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.580 * [taylor]: Taking taylor expansion of 1/3 in M
20.580 * [backup-simplify]: Simplify 1/3 into 1/3
20.580 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.580 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.580 * [taylor]: Taking taylor expansion of d in M
20.580 * [backup-simplify]: Simplify d into d
20.580 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.581 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.581 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.581 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.581 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.581 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.581 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.582 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.582 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.582 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
20.582 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
20.582 * [taylor]: Taking taylor expansion of +nan.0 in D
20.582 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.583 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
20.583 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.583 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.583 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.583 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.583 * [taylor]: Taking taylor expansion of D in D
20.583 * [backup-simplify]: Simplify 0 into 0
20.583 * [backup-simplify]: Simplify 1 into 1
20.583 * [backup-simplify]: Simplify (* 1 1) into 1
20.583 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.584 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
20.584 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
20.584 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
20.584 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
20.584 * [taylor]: Taking taylor expansion of 1/6 in D
20.584 * [backup-simplify]: Simplify 1/6 into 1/6
20.584 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
20.584 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.584 * [taylor]: Taking taylor expansion of l in D
20.584 * [backup-simplify]: Simplify l into l
20.584 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.584 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.584 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.584 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.584 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.584 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.584 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.584 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.584 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.584 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.585 * [taylor]: Taking taylor expansion of 1/3 in D
20.585 * [backup-simplify]: Simplify 1/3 into 1/3
20.585 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.585 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.585 * [taylor]: Taking taylor expansion of d in D
20.585 * [backup-simplify]: Simplify d into d
20.585 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.585 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.585 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.585 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.585 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.585 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.586 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.586 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.586 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.587 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.587 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.587 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.588 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.589 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.590 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.590 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.590 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.590 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.590 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.591 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
20.591 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
20.592 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.592 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.593 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.594 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.594 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
20.594 * [backup-simplify]: Simplify (- (/ 0 (pow D 2)) (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (/ 0 (pow D 2))))) into 0
20.595 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
20.596 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
20.596 * [backup-simplify]: Simplify (- 0) into 0
20.596 * [taylor]: Taking taylor expansion of 0 in D
20.596 * [backup-simplify]: Simplify 0 into 0
20.596 * [taylor]: Taking taylor expansion of 0 in D
20.596 * [backup-simplify]: Simplify 0 into 0
20.596 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.596 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.597 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.598 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.599 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.599 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.599 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.599 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.599 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.600 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
20.600 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
20.601 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.601 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.602 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.603 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (fabs (pow (/ l d) 1/3)) (/ 0 1)))) into 0
20.603 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ l d) 1/3)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
20.604 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
20.604 * [backup-simplify]: Simplify (- 0) into 0
20.604 * [backup-simplify]: Simplify 0 into 0
20.605 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.606 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.611 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
20.612 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.613 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 4 (log d)))))) into 0
20.615 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.616 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 l)))) into 0
20.616 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 2))))) into 0
20.617 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 3))))) into 0
20.618 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 6))))) into 0
20.621 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow l 7) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow l 7) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow l 7) 1)))) 6) into 0
20.622 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow l 7)))))) into 0
20.624 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.625 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4/3))))) into 0
20.625 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.626 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
20.627 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into 0
20.628 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.629 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.629 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.630 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.631 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
20.633 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))))) into 0
20.633 * [taylor]: Taking taylor expansion of 0 in l
20.633 * [backup-simplify]: Simplify 0 into 0
20.633 * [taylor]: Taking taylor expansion of 0 in h
20.633 * [backup-simplify]: Simplify 0 into 0
20.633 * [taylor]: Taking taylor expansion of 0 in h
20.633 * [backup-simplify]: Simplify 0 into 0
20.634 * [taylor]: Taking taylor expansion of 0 in h
20.634 * [backup-simplify]: Simplify 0 into 0
20.634 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
20.635 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
20.638 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
20.639 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
20.641 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.642 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.643 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.645 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.646 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.651 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
20.651 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.653 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 7 (log l)))))) into 0
20.654 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.655 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
20.655 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.656 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
20.657 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into 0
20.658 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.659 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.660 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.661 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.662 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
20.664 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))))) into 0
20.664 * [taylor]: Taking taylor expansion of 0 in h
20.664 * [backup-simplify]: Simplify 0 into 0
20.664 * [taylor]: Taking taylor expansion of 0 in M
20.664 * [backup-simplify]: Simplify 0 into 0
20.664 * [taylor]: Taking taylor expansion of 0 in M
20.664 * [backup-simplify]: Simplify 0 into 0
20.664 * [taylor]: Taking taylor expansion of 0 in M
20.664 * [backup-simplify]: Simplify 0 into 0
20.664 * [taylor]: Taking taylor expansion of 0 in M
20.664 * [backup-simplify]: Simplify 0 into 0
20.664 * [taylor]: Taking taylor expansion of 0 in M
20.664 * [backup-simplify]: Simplify 0 into 0
20.665 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
20.666 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
20.669 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
20.670 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
20.672 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.672 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 l)))) into 0
20.673 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 2))))) into 0
20.674 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 3))))) into 0
20.681 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 6))))) into 0
20.683 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow l 7) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow l 7) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow l 7) 1)))) 6) into 0
20.685 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow l 7)))))) into 0
20.687 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.688 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
20.689 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
20.693 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* +nan.0 +nan.0)))) (* 2 0)) into +nan.0
20.695 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (+ (* +nan.0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.696 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.696 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.697 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.698 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.700 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.703 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.703 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
20.703 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
20.703 * [taylor]: Taking taylor expansion of +nan.0 in M
20.703 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.703 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
20.703 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.703 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.703 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.703 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.703 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.703 * [taylor]: Taking taylor expansion of D in M
20.703 * [backup-simplify]: Simplify D into D
20.703 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.703 * [taylor]: Taking taylor expansion of M in M
20.703 * [backup-simplify]: Simplify 0 into 0
20.703 * [backup-simplify]: Simplify 1 into 1
20.703 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.704 * [backup-simplify]: Simplify (* 1 1) into 1
20.704 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.704 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.704 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
20.705 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
20.705 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
20.705 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
20.705 * [taylor]: Taking taylor expansion of 1/6 in M
20.705 * [backup-simplify]: Simplify 1/6 into 1/6
20.705 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
20.705 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.705 * [taylor]: Taking taylor expansion of l in M
20.705 * [backup-simplify]: Simplify l into l
20.705 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.705 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.705 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.705 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.705 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.705 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.705 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.705 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.705 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.705 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.705 * [taylor]: Taking taylor expansion of 1/3 in M
20.705 * [backup-simplify]: Simplify 1/3 into 1/3
20.706 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.706 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.706 * [taylor]: Taking taylor expansion of d in M
20.706 * [backup-simplify]: Simplify d into d
20.706 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.706 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.706 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.706 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.706 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.706 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.707 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.707 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.708 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.708 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
20.708 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
20.708 * [taylor]: Taking taylor expansion of +nan.0 in D
20.708 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.708 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
20.708 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.708 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.708 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.708 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.708 * [taylor]: Taking taylor expansion of D in D
20.708 * [backup-simplify]: Simplify 0 into 0
20.708 * [backup-simplify]: Simplify 1 into 1
20.709 * [backup-simplify]: Simplify (* 1 1) into 1
20.709 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.709 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
20.709 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
20.709 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
20.709 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
20.709 * [taylor]: Taking taylor expansion of 1/6 in D
20.709 * [backup-simplify]: Simplify 1/6 into 1/6
20.709 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
20.709 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.709 * [taylor]: Taking taylor expansion of l in D
20.709 * [backup-simplify]: Simplify l into l
20.709 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.709 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.709 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.709 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.710 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.710 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.710 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.710 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.710 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.710 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.710 * [taylor]: Taking taylor expansion of 1/3 in D
20.710 * [backup-simplify]: Simplify 1/3 into 1/3
20.710 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.710 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.710 * [taylor]: Taking taylor expansion of d in D
20.710 * [backup-simplify]: Simplify d into d
20.710 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.710 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.710 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.710 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.710 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.711 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.711 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.711 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.712 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.712 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.718 * [backup-simplify]: Simplify (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (pow (/ 1 l) 7) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (pow (* (/ 1 (/ 1 D)) (* (/ 1 (/ 1 M)) (* (/ 1 h) (* 1 1)))) 2)) (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (pow (/ 1 l) 7) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (* (pow (/ 1 D) -2) (* (pow (/ 1 M) -2) (* (/ 1 h) (* 1 1))))) (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (pow (/ 1 l) 7) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (pow (* (/ 1 (/ 1 D)) (* (/ 1 (/ 1 M)) (* 1 (* 1 1)))) 2)))) into (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))))))
20.720 * [backup-simplify]: Simplify (/ (* (* (* (fabs (/ (cbrt (/ 1 (- d))) (cbrt (/ 1 (- l))))) (sqrt (/ (cbrt (/ 1 (- d))) (cbrt (/ 1 (- l)))))) (sqrt (/ (/ 1 (- d)) (/ 1 (- h))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (/ 1 (- h))))) (* (/ 1 (- l)) 2)) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.720 * [approximate]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in (d l h M D) around 0
20.720 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
20.720 * [taylor]: Taking taylor expansion of 1/8 in D
20.720 * [backup-simplify]: Simplify 1/8 into 1/8
20.720 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
20.720 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in D
20.720 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.720 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.720 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in D
20.720 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.720 * [taylor]: Taking taylor expansion of D in D
20.720 * [backup-simplify]: Simplify 0 into 0
20.720 * [backup-simplify]: Simplify 1 into 1
20.720 * [taylor]: Taking taylor expansion of (pow M 2) in D
20.720 * [taylor]: Taking taylor expansion of M in D
20.720 * [backup-simplify]: Simplify M into M
20.721 * [backup-simplify]: Simplify (* 1 1) into 1
20.721 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.721 * [backup-simplify]: Simplify (* 1 (pow M 2)) into (pow M 2)
20.721 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow M 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow M 2))
20.721 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
20.721 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in D
20.721 * [taylor]: Taking taylor expansion of (/ 1 h) in D
20.721 * [taylor]: Taking taylor expansion of h in D
20.722 * [backup-simplify]: Simplify h into h
20.722 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.722 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.722 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.722 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.722 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
20.722 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
20.722 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
20.722 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
20.722 * [taylor]: Taking taylor expansion of 1/6 in D
20.722 * [backup-simplify]: Simplify 1/6 into 1/6
20.722 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
20.722 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.722 * [taylor]: Taking taylor expansion of l in D
20.722 * [backup-simplify]: Simplify l into l
20.722 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.722 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.722 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.722 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.723 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.723 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.723 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.723 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.723 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.723 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.723 * [taylor]: Taking taylor expansion of 1/3 in D
20.723 * [backup-simplify]: Simplify 1/3 into 1/3
20.723 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.723 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.723 * [taylor]: Taking taylor expansion of d in D
20.723 * [backup-simplify]: Simplify d into d
20.723 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.723 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.723 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.723 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.723 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.724 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
20.724 * [taylor]: Taking taylor expansion of 1/8 in M
20.724 * [backup-simplify]: Simplify 1/8 into 1/8
20.724 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
20.724 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.724 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.724 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.724 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.724 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.724 * [taylor]: Taking taylor expansion of D in M
20.724 * [backup-simplify]: Simplify D into D
20.724 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.724 * [taylor]: Taking taylor expansion of M in M
20.724 * [backup-simplify]: Simplify 0 into 0
20.724 * [backup-simplify]: Simplify 1 into 1
20.724 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.724 * [backup-simplify]: Simplify (* 1 1) into 1
20.725 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.725 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.725 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
20.725 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in M
20.725 * [taylor]: Taking taylor expansion of (/ 1 h) in M
20.725 * [taylor]: Taking taylor expansion of h in M
20.725 * [backup-simplify]: Simplify h into h
20.725 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.725 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.725 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.725 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.725 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
20.725 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
20.725 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
20.725 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
20.725 * [taylor]: Taking taylor expansion of 1/6 in M
20.725 * [backup-simplify]: Simplify 1/6 into 1/6
20.725 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
20.725 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.725 * [taylor]: Taking taylor expansion of l in M
20.725 * [backup-simplify]: Simplify l into l
20.725 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.725 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.725 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.725 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.725 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.725 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.725 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.725 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.725 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.726 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.726 * [taylor]: Taking taylor expansion of 1/3 in M
20.726 * [backup-simplify]: Simplify 1/3 into 1/3
20.726 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.726 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.726 * [taylor]: Taking taylor expansion of d in M
20.726 * [backup-simplify]: Simplify d into d
20.726 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.726 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.726 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.726 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.726 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.726 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in h
20.726 * [taylor]: Taking taylor expansion of 1/8 in h
20.726 * [backup-simplify]: Simplify 1/8 into 1/8
20.726 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in h
20.726 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
20.726 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
20.726 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.726 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
20.726 * [taylor]: Taking taylor expansion of (pow D 2) in h
20.726 * [taylor]: Taking taylor expansion of D in h
20.726 * [backup-simplify]: Simplify D into D
20.726 * [taylor]: Taking taylor expansion of (pow M 2) in h
20.726 * [taylor]: Taking taylor expansion of M in h
20.726 * [backup-simplify]: Simplify M into M
20.726 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.726 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.726 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.727 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.727 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in h
20.727 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
20.727 * [taylor]: Taking taylor expansion of (/ 1 h) in h
20.727 * [taylor]: Taking taylor expansion of h in h
20.727 * [backup-simplify]: Simplify 0 into 0
20.727 * [backup-simplify]: Simplify 1 into 1
20.727 * [backup-simplify]: Simplify (/ 1 1) into 1
20.727 * [backup-simplify]: Simplify (sqrt 0) into 0
20.729 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
20.729 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in h
20.729 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in h
20.729 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in h
20.729 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in h
20.729 * [taylor]: Taking taylor expansion of 1/6 in h
20.729 * [backup-simplify]: Simplify 1/6 into 1/6
20.729 * [taylor]: Taking taylor expansion of (log (pow l 7)) in h
20.729 * [taylor]: Taking taylor expansion of (pow l 7) in h
20.729 * [taylor]: Taking taylor expansion of l in h
20.729 * [backup-simplify]: Simplify l into l
20.729 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.729 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.729 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.729 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.729 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.729 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.729 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.729 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
20.729 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
20.729 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
20.729 * [taylor]: Taking taylor expansion of 1/3 in h
20.729 * [backup-simplify]: Simplify 1/3 into 1/3
20.729 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
20.729 * [taylor]: Taking taylor expansion of (pow d 4) in h
20.729 * [taylor]: Taking taylor expansion of d in h
20.729 * [backup-simplify]: Simplify d into d
20.729 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.729 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.729 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.730 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.730 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.730 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in l
20.730 * [taylor]: Taking taylor expansion of 1/8 in l
20.730 * [backup-simplify]: Simplify 1/8 into 1/8
20.730 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in l
20.730 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
20.730 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
20.730 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.730 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
20.730 * [taylor]: Taking taylor expansion of (pow D 2) in l
20.730 * [taylor]: Taking taylor expansion of D in l
20.730 * [backup-simplify]: Simplify D into D
20.730 * [taylor]: Taking taylor expansion of (pow M 2) in l
20.730 * [taylor]: Taking taylor expansion of M in l
20.730 * [backup-simplify]: Simplify M into M
20.730 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.730 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.730 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.730 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.730 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in l
20.730 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
20.730 * [taylor]: Taking taylor expansion of (/ 1 h) in l
20.730 * [taylor]: Taking taylor expansion of h in l
20.730 * [backup-simplify]: Simplify h into h
20.730 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.730 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.730 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.730 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.730 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in l
20.730 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in l
20.731 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in l
20.731 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in l
20.731 * [taylor]: Taking taylor expansion of 1/6 in l
20.731 * [backup-simplify]: Simplify 1/6 into 1/6
20.731 * [taylor]: Taking taylor expansion of (log (pow l 7)) in l
20.731 * [taylor]: Taking taylor expansion of (pow l 7) in l
20.731 * [taylor]: Taking taylor expansion of l in l
20.731 * [backup-simplify]: Simplify 0 into 0
20.731 * [backup-simplify]: Simplify 1 into 1
20.731 * [backup-simplify]: Simplify (* 1 1) into 1
20.731 * [backup-simplify]: Simplify (* 1 1) into 1
20.732 * [backup-simplify]: Simplify (* 1 1) into 1
20.732 * [backup-simplify]: Simplify (* 1 1) into 1
20.732 * [backup-simplify]: Simplify (log 1) into 0
20.732 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.732 * [backup-simplify]: Simplify (* 1/6 (* 7 (log l))) into (* 7/6 (log l))
20.733 * [backup-simplify]: Simplify (exp (* 7/6 (log l))) into (pow l 7/6)
20.733 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
20.733 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
20.733 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
20.733 * [taylor]: Taking taylor expansion of 1/3 in l
20.733 * [backup-simplify]: Simplify 1/3 into 1/3
20.733 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
20.733 * [taylor]: Taking taylor expansion of (pow d 4) in l
20.733 * [taylor]: Taking taylor expansion of d in l
20.733 * [backup-simplify]: Simplify d into d
20.733 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.733 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.733 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.733 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.733 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.733 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in d
20.733 * [taylor]: Taking taylor expansion of 1/8 in d
20.733 * [backup-simplify]: Simplify 1/8 into 1/8
20.733 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in d
20.733 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
20.733 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
20.733 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.733 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
20.733 * [taylor]: Taking taylor expansion of (pow D 2) in d
20.733 * [taylor]: Taking taylor expansion of D in d
20.733 * [backup-simplify]: Simplify D into D
20.733 * [taylor]: Taking taylor expansion of (pow M 2) in d
20.733 * [taylor]: Taking taylor expansion of M in d
20.733 * [backup-simplify]: Simplify M into M
20.733 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.733 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.733 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.733 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.734 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in d
20.734 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
20.734 * [taylor]: Taking taylor expansion of (/ 1 h) in d
20.734 * [taylor]: Taking taylor expansion of h in d
20.734 * [backup-simplify]: Simplify h into h
20.734 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.734 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.734 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.734 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.734 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in d
20.734 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in d
20.734 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in d
20.734 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in d
20.734 * [taylor]: Taking taylor expansion of 1/6 in d
20.734 * [backup-simplify]: Simplify 1/6 into 1/6
20.734 * [taylor]: Taking taylor expansion of (log (pow l 7)) in d
20.734 * [taylor]: Taking taylor expansion of (pow l 7) in d
20.734 * [taylor]: Taking taylor expansion of l in d
20.734 * [backup-simplify]: Simplify l into l
20.734 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.734 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.734 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.734 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.734 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.734 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.734 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.734 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
20.734 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
20.734 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
20.734 * [taylor]: Taking taylor expansion of 1/3 in d
20.734 * [backup-simplify]: Simplify 1/3 into 1/3
20.734 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
20.734 * [taylor]: Taking taylor expansion of (pow d 4) in d
20.734 * [taylor]: Taking taylor expansion of d in d
20.734 * [backup-simplify]: Simplify 0 into 0
20.734 * [backup-simplify]: Simplify 1 into 1
20.735 * [backup-simplify]: Simplify (* 1 1) into 1
20.735 * [backup-simplify]: Simplify (* 1 1) into 1
20.735 * [backup-simplify]: Simplify (log 1) into 0
20.736 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.736 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
20.736 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
20.736 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in d
20.736 * [taylor]: Taking taylor expansion of 1/8 in d
20.736 * [backup-simplify]: Simplify 1/8 into 1/8
20.736 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in d
20.736 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
20.736 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
20.736 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.736 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
20.736 * [taylor]: Taking taylor expansion of (pow D 2) in d
20.736 * [taylor]: Taking taylor expansion of D in d
20.736 * [backup-simplify]: Simplify D into D
20.736 * [taylor]: Taking taylor expansion of (pow M 2) in d
20.736 * [taylor]: Taking taylor expansion of M in d
20.736 * [backup-simplify]: Simplify M into M
20.736 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.736 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.736 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.736 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.736 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in d
20.736 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
20.736 * [taylor]: Taking taylor expansion of (/ 1 h) in d
20.736 * [taylor]: Taking taylor expansion of h in d
20.736 * [backup-simplify]: Simplify h into h
20.736 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.736 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.736 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.737 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.737 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in d
20.737 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in d
20.737 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in d
20.737 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in d
20.737 * [taylor]: Taking taylor expansion of 1/6 in d
20.737 * [backup-simplify]: Simplify 1/6 into 1/6
20.737 * [taylor]: Taking taylor expansion of (log (pow l 7)) in d
20.737 * [taylor]: Taking taylor expansion of (pow l 7) in d
20.737 * [taylor]: Taking taylor expansion of l in d
20.737 * [backup-simplify]: Simplify l into l
20.737 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.737 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.737 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.737 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.737 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.737 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.737 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.737 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
20.737 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
20.737 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
20.737 * [taylor]: Taking taylor expansion of 1/3 in d
20.737 * [backup-simplify]: Simplify 1/3 into 1/3
20.737 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
20.737 * [taylor]: Taking taylor expansion of (pow d 4) in d
20.737 * [taylor]: Taking taylor expansion of d in d
20.737 * [backup-simplify]: Simplify 0 into 0
20.737 * [backup-simplify]: Simplify 1 into 1
20.737 * [backup-simplify]: Simplify (* 1 1) into 1
20.738 * [backup-simplify]: Simplify (* 1 1) into 1
20.738 * [backup-simplify]: Simplify (log 1) into 0
20.738 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.738 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
20.738 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
20.739 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow d 4/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.739 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))
20.739 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))
20.739 * [backup-simplify]: Simplify (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.739 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in l
20.739 * [taylor]: Taking taylor expansion of 1/8 in l
20.739 * [backup-simplify]: Simplify 1/8 into 1/8
20.739 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in l
20.739 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
20.739 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
20.739 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.740 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
20.740 * [taylor]: Taking taylor expansion of (pow D 2) in l
20.740 * [taylor]: Taking taylor expansion of D in l
20.740 * [backup-simplify]: Simplify D into D
20.740 * [taylor]: Taking taylor expansion of (pow M 2) in l
20.740 * [taylor]: Taking taylor expansion of M in l
20.740 * [backup-simplify]: Simplify M into M
20.740 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.740 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.740 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.740 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.740 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in l
20.740 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
20.740 * [taylor]: Taking taylor expansion of (/ 1 h) in l
20.740 * [taylor]: Taking taylor expansion of h in l
20.740 * [backup-simplify]: Simplify h into h
20.740 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
20.740 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
20.740 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
20.740 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
20.740 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in l
20.740 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in l
20.740 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in l
20.740 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in l
20.740 * [taylor]: Taking taylor expansion of 1/6 in l
20.740 * [backup-simplify]: Simplify 1/6 into 1/6
20.740 * [taylor]: Taking taylor expansion of (log (pow l 7)) in l
20.740 * [taylor]: Taking taylor expansion of (pow l 7) in l
20.740 * [taylor]: Taking taylor expansion of l in l
20.740 * [backup-simplify]: Simplify 0 into 0
20.740 * [backup-simplify]: Simplify 1 into 1
20.741 * [backup-simplify]: Simplify (* 1 1) into 1
20.741 * [backup-simplify]: Simplify (* 1 1) into 1
20.741 * [backup-simplify]: Simplify (* 1 1) into 1
20.741 * [backup-simplify]: Simplify (* 1 1) into 1
20.742 * [backup-simplify]: Simplify (log 1) into 0
20.742 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.742 * [backup-simplify]: Simplify (* 1/6 (* 7 (log l))) into (* 7/6 (log l))
20.742 * [backup-simplify]: Simplify (exp (* 7/6 (log l))) into (pow l 7/6)
20.742 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
20.742 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
20.742 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
20.742 * [taylor]: Taking taylor expansion of 1/3 in l
20.742 * [backup-simplify]: Simplify 1/3 into 1/3
20.742 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
20.742 * [taylor]: Taking taylor expansion of (pow d 4) in l
20.742 * [taylor]: Taking taylor expansion of d in l
20.742 * [backup-simplify]: Simplify d into d
20.742 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.742 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.742 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.743 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.743 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.743 * [backup-simplify]: Simplify (* (pow l 7/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.743 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))
20.743 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))
20.743 * [backup-simplify]: Simplify (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.743 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in h
20.743 * [taylor]: Taking taylor expansion of 1/8 in h
20.743 * [backup-simplify]: Simplify 1/8 into 1/8
20.743 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in h
20.744 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
20.744 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
20.744 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.744 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
20.744 * [taylor]: Taking taylor expansion of (pow D 2) in h
20.744 * [taylor]: Taking taylor expansion of D in h
20.744 * [backup-simplify]: Simplify D into D
20.744 * [taylor]: Taking taylor expansion of (pow M 2) in h
20.744 * [taylor]: Taking taylor expansion of M in h
20.744 * [backup-simplify]: Simplify M into M
20.744 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.744 * [backup-simplify]: Simplify (* M M) into (pow M 2)
20.744 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
20.744 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
20.744 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in h
20.744 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
20.744 * [taylor]: Taking taylor expansion of (/ 1 h) in h
20.744 * [taylor]: Taking taylor expansion of h in h
20.744 * [backup-simplify]: Simplify 0 into 0
20.744 * [backup-simplify]: Simplify 1 into 1
20.744 * [backup-simplify]: Simplify (/ 1 1) into 1
20.745 * [backup-simplify]: Simplify (sqrt 0) into 0
20.746 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
20.746 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in h
20.746 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in h
20.746 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in h
20.746 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in h
20.746 * [taylor]: Taking taylor expansion of 1/6 in h
20.746 * [backup-simplify]: Simplify 1/6 into 1/6
20.746 * [taylor]: Taking taylor expansion of (log (pow l 7)) in h
20.746 * [taylor]: Taking taylor expansion of (pow l 7) in h
20.746 * [taylor]: Taking taylor expansion of l in h
20.746 * [backup-simplify]: Simplify l into l
20.746 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.746 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.746 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.746 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.746 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.746 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.746 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.746 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
20.746 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
20.746 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
20.746 * [taylor]: Taking taylor expansion of 1/3 in h
20.746 * [backup-simplify]: Simplify 1/3 into 1/3
20.746 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
20.746 * [taylor]: Taking taylor expansion of (pow d 4) in h
20.746 * [taylor]: Taking taylor expansion of d in h
20.746 * [backup-simplify]: Simplify d into d
20.746 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.746 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.746 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.747 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.747 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.747 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.747 * [backup-simplify]: Simplify (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into 0
20.747 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) into 0
20.747 * [backup-simplify]: Simplify (* 1/8 0) into 0
20.747 * [taylor]: Taking taylor expansion of 0 in M
20.747 * [backup-simplify]: Simplify 0 into 0
20.748 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.748 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.749 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
20.750 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.750 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (* 4 (log d)))) into 0
20.750 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
20.751 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.751 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.751 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.751 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.751 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
20.752 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
20.753 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.753 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow d 4/3))) into 0
20.753 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
20.753 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.753 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.753 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.754 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.754 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
20.755 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.755 * [taylor]: Taking taylor expansion of 0 in l
20.755 * [backup-simplify]: Simplify 0 into 0
20.755 * [taylor]: Taking taylor expansion of 0 in h
20.755 * [backup-simplify]: Simplify 0 into 0
20.755 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.756 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.756 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.757 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.758 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.758 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.759 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.760 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.760 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.761 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
20.762 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.762 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (* 7 (log l)))) into 0
20.763 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
20.763 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.764 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
20.764 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.764 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.764 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.765 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.765 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
20.766 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.766 * [taylor]: Taking taylor expansion of 0 in h
20.766 * [backup-simplify]: Simplify 0 into 0
20.767 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.767 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.767 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.768 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.769 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.769 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.769 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.769 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.769 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.770 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
20.771 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
20.771 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.772 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.772 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.772 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
20.772 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.772 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
20.773 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.774 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.775 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.775 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
20.775 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
20.775 * [taylor]: Taking taylor expansion of +nan.0 in M
20.775 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.775 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
20.775 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.775 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.776 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.776 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.776 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.776 * [taylor]: Taking taylor expansion of D in M
20.776 * [backup-simplify]: Simplify D into D
20.776 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.776 * [taylor]: Taking taylor expansion of M in M
20.776 * [backup-simplify]: Simplify 0 into 0
20.776 * [backup-simplify]: Simplify 1 into 1
20.776 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.776 * [backup-simplify]: Simplify (* 1 1) into 1
20.776 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.776 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.776 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
20.776 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
20.777 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
20.777 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
20.777 * [taylor]: Taking taylor expansion of 1/6 in M
20.777 * [backup-simplify]: Simplify 1/6 into 1/6
20.777 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
20.777 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.777 * [taylor]: Taking taylor expansion of l in M
20.777 * [backup-simplify]: Simplify l into l
20.777 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.777 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.777 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.777 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.777 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.777 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.777 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.777 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.777 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.777 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.777 * [taylor]: Taking taylor expansion of 1/3 in M
20.777 * [backup-simplify]: Simplify 1/3 into 1/3
20.777 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.777 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.777 * [taylor]: Taking taylor expansion of d in M
20.777 * [backup-simplify]: Simplify d into d
20.777 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.778 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.778 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.778 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.778 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.778 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.778 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.779 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.779 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.779 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
20.779 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
20.779 * [taylor]: Taking taylor expansion of +nan.0 in D
20.779 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.779 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
20.779 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.779 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.779 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.779 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.779 * [taylor]: Taking taylor expansion of D in D
20.779 * [backup-simplify]: Simplify 0 into 0
20.780 * [backup-simplify]: Simplify 1 into 1
20.780 * [backup-simplify]: Simplify (* 1 1) into 1
20.780 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.780 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
20.780 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
20.780 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
20.780 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
20.780 * [taylor]: Taking taylor expansion of 1/6 in D
20.780 * [backup-simplify]: Simplify 1/6 into 1/6
20.780 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
20.780 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.780 * [taylor]: Taking taylor expansion of l in D
20.781 * [backup-simplify]: Simplify l into l
20.781 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.781 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.781 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.781 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.781 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.781 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.781 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.781 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.781 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.781 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.781 * [taylor]: Taking taylor expansion of 1/3 in D
20.781 * [backup-simplify]: Simplify 1/3 into 1/3
20.781 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.781 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.781 * [taylor]: Taking taylor expansion of d in D
20.781 * [backup-simplify]: Simplify d into d
20.781 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.781 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.781 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.782 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.782 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.782 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.782 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.782 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.783 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.783 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.784 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.785 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.786 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
20.787 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.787 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (* 4 (log d))))) into 0
20.788 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.789 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
20.789 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
20.789 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
20.790 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
20.791 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow l 7) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow l 7) 1)))) 2) into 0
20.791 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (pow l 7))))) into 0
20.792 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.793 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (* 0 (pow d 4/3)))) into 0
20.793 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.793 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
20.794 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
20.794 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.794 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.794 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.795 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.795 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.796 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
20.796 * [taylor]: Taking taylor expansion of 0 in l
20.796 * [backup-simplify]: Simplify 0 into 0
20.796 * [taylor]: Taking taylor expansion of 0 in h
20.796 * [backup-simplify]: Simplify 0 into 0
20.796 * [taylor]: Taking taylor expansion of 0 in h
20.796 * [backup-simplify]: Simplify 0 into 0
20.797 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
20.797 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
20.798 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
20.799 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
20.800 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.800 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.801 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.801 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.802 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
20.804 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
20.804 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.805 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (* 7 (log l))))) into 0
20.805 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.806 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
20.806 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.810 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
20.811 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
20.812 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.812 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.812 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.813 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.814 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
20.816 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
20.816 * [taylor]: Taking taylor expansion of 0 in h
20.816 * [backup-simplify]: Simplify 0 into 0
20.816 * [taylor]: Taking taylor expansion of 0 in M
20.816 * [backup-simplify]: Simplify 0 into 0
20.816 * [taylor]: Taking taylor expansion of 0 in M
20.816 * [backup-simplify]: Simplify 0 into 0
20.816 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
20.817 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
20.818 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
20.819 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
20.821 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.821 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
20.822 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
20.822 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
20.823 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
20.824 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow l 7) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow l 7) 1)))) 2) into 0
20.825 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (pow l 7))))) into 0
20.826 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
20.827 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
20.828 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
20.831 * [backup-simplify]: Simplify (/ (- 0 (pow +nan.0 2) (+)) (* 2 0)) into +nan.0
20.832 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.832 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
20.833 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
20.833 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
20.834 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.835 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.837 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.837 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
20.837 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
20.837 * [taylor]: Taking taylor expansion of +nan.0 in M
20.837 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.837 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
20.837 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.837 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.837 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.837 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.837 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.837 * [taylor]: Taking taylor expansion of D in M
20.837 * [backup-simplify]: Simplify D into D
20.837 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.837 * [taylor]: Taking taylor expansion of M in M
20.837 * [backup-simplify]: Simplify 0 into 0
20.838 * [backup-simplify]: Simplify 1 into 1
20.838 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.838 * [backup-simplify]: Simplify (* 1 1) into 1
20.838 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.838 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.838 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
20.838 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
20.838 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
20.838 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
20.838 * [taylor]: Taking taylor expansion of 1/6 in M
20.838 * [backup-simplify]: Simplify 1/6 into 1/6
20.838 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
20.838 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.838 * [taylor]: Taking taylor expansion of l in M
20.838 * [backup-simplify]: Simplify l into l
20.838 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.839 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.839 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.839 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.839 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.839 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.839 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.839 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.839 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.839 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.839 * [taylor]: Taking taylor expansion of 1/3 in M
20.839 * [backup-simplify]: Simplify 1/3 into 1/3
20.839 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.839 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.839 * [taylor]: Taking taylor expansion of d in M
20.839 * [backup-simplify]: Simplify d into d
20.839 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.839 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.839 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.839 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.840 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.840 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.840 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.840 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.841 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.841 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
20.841 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
20.841 * [taylor]: Taking taylor expansion of +nan.0 in D
20.841 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.841 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
20.841 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.841 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.841 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.841 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.841 * [taylor]: Taking taylor expansion of D in D
20.841 * [backup-simplify]: Simplify 0 into 0
20.841 * [backup-simplify]: Simplify 1 into 1
20.842 * [backup-simplify]: Simplify (* 1 1) into 1
20.842 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.842 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
20.842 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
20.842 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
20.842 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
20.842 * [taylor]: Taking taylor expansion of 1/6 in D
20.842 * [backup-simplify]: Simplify 1/6 into 1/6
20.842 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
20.842 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.842 * [taylor]: Taking taylor expansion of l in D
20.842 * [backup-simplify]: Simplify l into l
20.842 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.842 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.842 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.842 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.843 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.843 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.843 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.843 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.843 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.843 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.843 * [taylor]: Taking taylor expansion of 1/3 in D
20.843 * [backup-simplify]: Simplify 1/3 into 1/3
20.843 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.843 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.843 * [taylor]: Taking taylor expansion of d in D
20.843 * [backup-simplify]: Simplify d into d
20.843 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.843 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.843 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.843 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.843 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.843 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.844 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.844 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.845 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.845 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.845 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.845 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.846 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.847 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.848 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.848 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.848 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.848 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.848 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.849 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
20.850 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
20.851 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.851 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.852 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.852 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
20.852 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
20.852 * [backup-simplify]: Simplify (- (/ 0 (pow D 2)) (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (/ 0 (pow D 2))))) into 0
20.853 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
20.854 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
20.854 * [backup-simplify]: Simplify (- 0) into 0
20.854 * [taylor]: Taking taylor expansion of 0 in D
20.854 * [backup-simplify]: Simplify 0 into 0
20.854 * [taylor]: Taking taylor expansion of 0 in D
20.854 * [backup-simplify]: Simplify 0 into 0
20.854 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
20.855 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
20.855 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
20.856 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
20.857 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.857 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
20.857 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
20.857 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
20.857 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
20.858 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
20.859 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
20.860 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
20.860 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
20.861 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
20.861 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (fabs (pow (/ l d) 1/3)) (/ 0 1)))) into 0
20.862 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ l d) 1/3)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
20.863 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
20.863 * [backup-simplify]: Simplify (- 0) into 0
20.863 * [backup-simplify]: Simplify 0 into 0
20.864 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.865 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.871 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
20.871 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
20.873 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 4 (log d)))))) into 0
20.875 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.876 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 l)))) into 0
20.877 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 2))))) into 0
20.878 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 3))))) into 0
20.879 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 6))))) into 0
20.882 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow l 7) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow l 7) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow l 7) 1)))) 6) into 0
20.883 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow l 7)))))) into 0
20.885 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.886 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4/3))))) into 0
20.887 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.888 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
20.889 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into 0
20.890 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.891 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.892 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.892 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.894 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
20.896 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))))) into 0
20.896 * [taylor]: Taking taylor expansion of 0 in l
20.896 * [backup-simplify]: Simplify 0 into 0
20.896 * [taylor]: Taking taylor expansion of 0 in h
20.896 * [backup-simplify]: Simplify 0 into 0
20.896 * [taylor]: Taking taylor expansion of 0 in h
20.896 * [backup-simplify]: Simplify 0 into 0
20.896 * [taylor]: Taking taylor expansion of 0 in h
20.896 * [backup-simplify]: Simplify 0 into 0
20.897 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
20.898 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
20.901 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
20.902 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
20.904 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.905 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.906 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.907 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.908 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
20.913 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
20.913 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
20.915 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 7 (log l)))))) into 0
20.916 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.917 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
20.917 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
20.918 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
20.919 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into 0
20.920 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.921 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.922 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.922 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.924 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
20.926 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))))) into 0
20.926 * [taylor]: Taking taylor expansion of 0 in h
20.926 * [backup-simplify]: Simplify 0 into 0
20.926 * [taylor]: Taking taylor expansion of 0 in M
20.926 * [backup-simplify]: Simplify 0 into 0
20.926 * [taylor]: Taking taylor expansion of 0 in M
20.926 * [backup-simplify]: Simplify 0 into 0
20.926 * [taylor]: Taking taylor expansion of 0 in M
20.926 * [backup-simplify]: Simplify 0 into 0
20.926 * [taylor]: Taking taylor expansion of 0 in M
20.926 * [backup-simplify]: Simplify 0 into 0
20.926 * [taylor]: Taking taylor expansion of 0 in M
20.926 * [backup-simplify]: Simplify 0 into 0
20.928 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
20.928 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
20.931 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
20.932 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
20.934 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.935 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 l)))) into 0
20.936 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 2))))) into 0
20.937 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 3))))) into 0
20.938 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 6))))) into 0
20.940 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow l 7) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow l 7) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow l 7) 1)))) 6) into 0
20.942 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow l 7)))))) into 0
20.943 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
20.944 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
20.945 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
20.949 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* +nan.0 +nan.0)))) (* 2 0)) into +nan.0
20.951 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (+ (* +nan.0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.952 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
20.953 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
20.953 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
20.954 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
20.961 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.965 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.965 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
20.965 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
20.965 * [taylor]: Taking taylor expansion of +nan.0 in M
20.965 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.965 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
20.965 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
20.965 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
20.965 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.965 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
20.965 * [taylor]: Taking taylor expansion of (pow D 2) in M
20.965 * [taylor]: Taking taylor expansion of D in M
20.965 * [backup-simplify]: Simplify D into D
20.965 * [taylor]: Taking taylor expansion of (pow M 2) in M
20.965 * [taylor]: Taking taylor expansion of M in M
20.965 * [backup-simplify]: Simplify 0 into 0
20.965 * [backup-simplify]: Simplify 1 into 1
20.965 * [backup-simplify]: Simplify (* D D) into (pow D 2)
20.966 * [backup-simplify]: Simplify (* 1 1) into 1
20.966 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
20.966 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
20.966 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
20.966 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
20.966 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
20.966 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
20.966 * [taylor]: Taking taylor expansion of 1/6 in M
20.966 * [backup-simplify]: Simplify 1/6 into 1/6
20.966 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
20.966 * [taylor]: Taking taylor expansion of (pow l 7) in M
20.966 * [taylor]: Taking taylor expansion of l in M
20.966 * [backup-simplify]: Simplify l into l
20.967 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.967 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.967 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.967 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.967 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.967 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.967 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.967 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
20.967 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
20.967 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
20.967 * [taylor]: Taking taylor expansion of 1/3 in M
20.967 * [backup-simplify]: Simplify 1/3 into 1/3
20.967 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
20.967 * [taylor]: Taking taylor expansion of (pow d 4) in M
20.967 * [taylor]: Taking taylor expansion of d in M
20.967 * [backup-simplify]: Simplify d into d
20.967 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.968 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.968 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.968 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.968 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.968 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.968 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.969 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.969 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.969 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
20.969 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
20.969 * [taylor]: Taking taylor expansion of +nan.0 in D
20.969 * [backup-simplify]: Simplify +nan.0 into +nan.0
20.969 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
20.969 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
20.969 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
20.970 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
20.970 * [taylor]: Taking taylor expansion of (pow D 2) in D
20.970 * [taylor]: Taking taylor expansion of D in D
20.970 * [backup-simplify]: Simplify 0 into 0
20.970 * [backup-simplify]: Simplify 1 into 1
20.970 * [backup-simplify]: Simplify (* 1 1) into 1
20.970 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
20.970 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
20.970 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
20.970 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
20.970 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
20.971 * [taylor]: Taking taylor expansion of 1/6 in D
20.971 * [backup-simplify]: Simplify 1/6 into 1/6
20.971 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
20.971 * [taylor]: Taking taylor expansion of (pow l 7) in D
20.971 * [taylor]: Taking taylor expansion of l in D
20.971 * [backup-simplify]: Simplify l into l
20.971 * [backup-simplify]: Simplify (* l l) into (pow l 2)
20.971 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
20.971 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
20.971 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
20.971 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
20.971 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
20.971 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
20.971 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
20.971 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
20.971 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
20.971 * [taylor]: Taking taylor expansion of 1/3 in D
20.971 * [backup-simplify]: Simplify 1/3 into 1/3
20.971 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
20.971 * [taylor]: Taking taylor expansion of (pow d 4) in D
20.971 * [taylor]: Taking taylor expansion of d in D
20.971 * [backup-simplify]: Simplify d into d
20.971 * [backup-simplify]: Simplify (* d d) into (pow d 2)
20.972 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
20.972 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
20.972 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
20.972 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
20.972 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
20.972 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
20.972 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
20.973 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.973 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
20.979 * [backup-simplify]: Simplify (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (pow (/ 1 (- l)) 7) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (pow (* (/ 1 (/ 1 (- D))) (* (/ 1 (/ 1 (- M))) (* (/ 1 (- h)) (* 1 1)))) 2)) (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (pow (/ 1 (- l)) 7) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (* (pow (/ 1 (- D)) -2) (* (pow (/ 1 (- M)) -2) (* (/ 1 (- h)) (* 1 1))))) (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (pow (/ 1 (- l)) 7) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (pow (* (/ 1 (/ 1 (- D))) (* (/ 1 (/ 1 (- M))) (* 1 (* 1 1)))) 2)))) into (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 (pow l 7)) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 (pow l 7)) 1/6)))))))))
20.979 * * * [progress]: simplifying candidates
20.979 * * * * [progress]: [ 1 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (pow (/ d h) 1/2)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.979 * * * * [progress]: [ 2 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (pow (sqrt (/ d h)) 1)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.979 * * * * [progress]: [ 3 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (exp (log (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.979 * * * * [progress]: [ 4 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (log (exp (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.979 * * * * [progress]: [ 5 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 6 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (cbrt (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 7 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (* (cbrt (/ d h)) (cbrt (/ d h)))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 8 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 9 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h)))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 10 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h))) (sqrt (/ (cbrt d) (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 11 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 12 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h)))) (sqrt (/ (sqrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 13 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (sqrt d) (sqrt h))) (sqrt (/ (sqrt d) (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 14 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 15 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 16 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (sqrt h))) (sqrt (/ d (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.980 * * * * [progress]: [ 17 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 1)) (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 18 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt 1) (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 19 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt d) (sqrt (/ 1 h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 20 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (/ (sqrt d) (sqrt h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 21 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (pow (/ d h) (/ 1 2))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 22 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 23 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (fabs (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 24 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (fabs (/ (sqrt d) (sqrt h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 25 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* 1 (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 26 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (posit16->real (real->posit16 (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 27 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (pow (/ d h) 1/2)) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 28 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (pow (sqrt (/ d h)) 1)) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 29 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (exp (log (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.981 * * * * [progress]: [ 30 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (log (exp (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 31 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 32 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 33 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (* (cbrt (/ d h)) (cbrt (/ d h)))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 34 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 35 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h)))) (sqrt (/ (cbrt d) (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 36 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h))) (sqrt (/ (cbrt d) (sqrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 37 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) h)))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 38 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h)))) (sqrt (/ (sqrt d) (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 39 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (sqrt d) (sqrt h))) (sqrt (/ (sqrt d) (sqrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 40 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) h)))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 41 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.982 * * * * [progress]: [ 42 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (sqrt h))) (sqrt (/ d (sqrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 43 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 1)) (sqrt (/ d h)))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 44 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt 1) (sqrt (/ d h)))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 45 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt d) (sqrt (/ 1 h)))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 46 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (/ (sqrt d) (sqrt h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 47 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (pow (/ d h) (/ 1 2))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 48 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 49 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (fabs (sqrt (/ d h)))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 50 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (fabs (/ (sqrt d) (sqrt h)))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 51 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* 1 (sqrt (/ d h)))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 52 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (posit16->real (real->posit16 (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
20.983 * * * * [progress]: [ 53 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.983 * * * * [progress]: [ 54 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.983 * * * * [progress]: [ 55 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.983 * * * * [progress]: [ 56 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.984 * * * * [progress]: [ 57 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.984 * * * * [progress]: [ 58 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.984 * * * * [progress]: [ 59 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.984 * * * * [progress]: [ 60 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.984 * * * * [progress]: [ 61 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.984 * * * * [progress]: [ 62 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
20.984 * * * * [progress]: [ 63 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.984 * * * * [progress]: [ 64 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.984 * * * * [progress]: [ 65 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.984 * * * * [progress]: [ 66 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.984 * * * * [progress]: [ 67 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.985 * * * * [progress]: [ 68 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.985 * * * * [progress]: [ 69 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.985 * * * * [progress]: [ 70 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.985 * * * * [progress]: [ 71 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.985 * * * * [progress]: [ 72 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.985 * * * * [progress]: [ 73 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.985 * * * * [progress]: [ 74 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.985 * * * * [progress]: [ 75 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.986 * * * * [progress]: [ 76 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.986 * * * * [progress]: [ 77 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.986 * * * * [progress]: [ 78 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.986 * * * * [progress]: [ 79 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.986 * * * * [progress]: [ 80 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.986 * * * * [progress]: [ 81 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.986 * * * * [progress]: [ 82 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.986 * * * * [progress]: [ 83 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.986 * * * * [progress]: [ 84 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.986 * * * * [progress]: [ 85 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.986 * * * * [progress]: [ 86 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 87 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 88 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.987 * * * * [progress]: [ 89 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 90 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 91 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 92 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 93 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.987 * * * * [progress]: [ 94 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 95 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 96 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.987 * * * * [progress]: [ 97 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 98 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.988 * * * * [progress]: [ 99 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 100 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 101 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 102 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 103 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.988 * * * * [progress]: [ 104 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.988 * * * * [progress]: [ 105 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 106 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 107 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 108 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.988 * * * * [progress]: [ 109 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.989 * * * * [progress]: [ 110 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.989 * * * * [progress]: [ 111 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.989 * * * * [progress]: [ 112 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.989 * * * * [progress]: [ 113 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.989 * * * * [progress]: [ 114 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.989 * * * * [progress]: [ 115 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.989 * * * * [progress]: [ 116 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.989 * * * * [progress]: [ 117 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.989 * * * * [progress]: [ 118 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.989 * * * * [progress]: [ 119 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.989 * * * * [progress]: [ 120 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
20.990 * * * * [progress]: [ 121 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
20.990 * * * * [progress]: [ 122 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.990 * * * * [progress]: [ 123 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
20.990 * * * * [progress]: [ 124 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.990 * * * * [progress]: [ 125 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.990 * * * * [progress]: [ 126 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (exp (log (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.990 * * * * [progress]: [ 127 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (log (exp (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.990 * * * * [progress]: [ 128 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.990 * * * * [progress]: [ 129 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.990 * * * * [progress]: [ 130 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.991 * * * * [progress]: [ 131 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.991 * * * * [progress]: [ 132 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.991 * * * * [progress]: [ 133 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.991 * * * * [progress]: [ 134 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.991 * * * * [progress]: [ 135 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.991 * * * * [progress]: [ 136 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.991 * * * * [progress]: [ 137 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 138 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 139 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 140 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 141 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 142 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 143 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 144 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 145 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.992 * * * * [progress]: [ 146 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 147 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 148 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 149 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 150 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 151 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 152 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 153 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 154 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.993 * * * * [progress]: [ 155 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 156 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 157 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 158 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 159 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 160 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 161 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 162 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 163 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 164 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.994 * * * * [progress]: [ 165 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 166 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 167 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 168 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 169 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 170 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 171 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 172 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 173 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.995 * * * * [progress]: [ 174 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 175 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 176 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 177 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 178 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 179 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 180 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 181 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 182 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 183 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.996 * * * * [progress]: [ 184 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 185 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 186 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 187 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 188 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 189 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 190 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 191 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 192 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 193 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (sqrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (sqrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.997 * * * * [progress]: [ 194 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* M h))) (* (* (sqrt (cbrt l)) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
20.998 * * * * [progress]: [ 195 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d)))) (* l 2))))>
20.998 * * * * [progress]: [ 196 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d)))) (* l 2))))>
20.998 * * * * [progress]: [ 197 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* M (* M h))) (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
20.998 * * * * [progress]: [ 198 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (sqrt h) (/ 2 (/ D d)))) (* l 2))))>
20.998 * * * * [progress]: [ 199 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (sqrt h) (/ 2 (/ D d)))) (* l 2))))>
20.998 * * * * [progress]: [ 200 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* M (* M h))) (* (sqrt (cbrt l)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
20.998 * * * * [progress]: [ 201 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (* (sqrt (cbrt l)) (/ 2 (/ D d)))) (* l 2))))>
20.998 * * * * [progress]: [ 202 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (sqrt (cbrt l)) (/ 2 (/ D d)))) (* l 2))))>
20.998 * * * * [progress]: [ 203 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* 1 (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))>
20.998 * * * * [progress]: [ 204 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))>
20.998 * * * * [progress]: [ 205 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))>
20.998 * * * * [progress]: [ 206 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* M h))) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (* l 2))))>
20.998 * * * * [progress]: [ 207 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (/ 2 (/ D d))) (* l 2))))>
20.999 * * * * [progress]: [ 208 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (/ 2 (/ D d))) (* l 2))))>
20.999 * * * * [progress]: [ 209 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (sqrt (cbrt l)) (sqrt h))) (* l 2))))>
20.999 * * * * [progress]: [ 210 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (sqrt h)) (* l 2))))>
20.999 * * * * [progress]: [ 211 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (sqrt (cbrt l))) (* l 2))))>
20.999 * * * * [progress]: [ 212 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (posit16->real (real->posit16 (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
20.999 * * * * [progress]: [ 213 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* l 2))))>
20.999 * * * * [progress]: [ 214 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (pow (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)) 1)))>
20.999 * * * * [progress]: [ 215 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
20.999 * * * * [progress]: [ 216 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
20.999 * * * * [progress]: [ 217 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
20.999 * * * * [progress]: [ 218 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
20.999 * * * * [progress]: [ 219 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.000 * * * * [progress]: [ 220 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.000 * * * * [progress]: [ 221 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.000 * * * * [progress]: [ 222 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.000 * * * * [progress]: [ 223 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.000 * * * * [progress]: [ 224 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.000 * * * * [progress]: [ 225 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.000 * * * * [progress]: [ 226 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.000 * * * * [progress]: [ 227 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.000 * * * * [progress]: [ 228 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.000 * * * * [progress]: [ 229 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.000 * * * * [progress]: [ 230 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.001 * * * * [progress]: [ 231 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.001 * * * * [progress]: [ 232 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.001 * * * * [progress]: [ 233 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.001 * * * * [progress]: [ 234 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.001 * * * * [progress]: [ 235 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.001 * * * * [progress]: [ 236 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.001 * * * * [progress]: [ 237 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.001 * * * * [progress]: [ 238 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.001 * * * * [progress]: [ 239 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.001 * * * * [progress]: [ 240 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.001 * * * * [progress]: [ 241 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.002 * * * * [progress]: [ 242 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.002 * * * * [progress]: [ 243 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.002 * * * * [progress]: [ 244 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.002 * * * * [progress]: [ 245 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.002 * * * * [progress]: [ 246 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.002 * * * * [progress]: [ 247 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.002 * * * * [progress]: [ 248 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.002 * * * * [progress]: [ 249 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.002 * * * * [progress]: [ 250 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.002 * * * * [progress]: [ 251 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.002 * * * * [progress]: [ 252 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.003 * * * * [progress]: [ 253 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.003 * * * * [progress]: [ 254 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.003 * * * * [progress]: [ 255 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.003 * * * * [progress]: [ 256 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.003 * * * * [progress]: [ 257 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.003 * * * * [progress]: [ 258 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.003 * * * * [progress]: [ 259 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.003 * * * * [progress]: [ 260 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.003 * * * * [progress]: [ 261 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.003 * * * * [progress]: [ 262 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.003 * * * * [progress]: [ 263 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.004 * * * * [progress]: [ 264 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.004 * * * * [progress]: [ 265 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.004 * * * * [progress]: [ 266 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.004 * * * * [progress]: [ 267 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.004 * * * * [progress]: [ 268 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.004 * * * * [progress]: [ 269 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.004 * * * * [progress]: [ 270 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.004 * * * * [progress]: [ 271 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.004 * * * * [progress]: [ 272 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.004 * * * * [progress]: [ 273 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.004 * * * * [progress]: [ 274 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.005 * * * * [progress]: [ 275 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.005 * * * * [progress]: [ 276 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.005 * * * * [progress]: [ 277 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.005 * * * * [progress]: [ 278 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.005 * * * * [progress]: [ 279 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.005 * * * * [progress]: [ 280 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.005 * * * * [progress]: [ 281 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.005 * * * * [progress]: [ 282 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.005 * * * * [progress]: [ 283 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.005 * * * * [progress]: [ 284 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.005 * * * * [progress]: [ 285 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.006 * * * * [progress]: [ 286 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.006 * * * * [progress]: [ 287 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.006 * * * * [progress]: [ 288 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.006 * * * * [progress]: [ 289 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.006 * * * * [progress]: [ 290 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.006 * * * * [progress]: [ 291 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.006 * * * * [progress]: [ 292 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.006 * * * * [progress]: [ 293 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.006 * * * * [progress]: [ 294 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.006 * * * * [progress]: [ 295 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.006 * * * * [progress]: [ 296 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.006 * * * * [progress]: [ 297 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.007 * * * * [progress]: [ 298 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.007 * * * * [progress]: [ 299 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.007 * * * * [progress]: [ 300 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.007 * * * * [progress]: [ 301 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.007 * * * * [progress]: [ 302 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.007 * * * * [progress]: [ 303 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.007 * * * * [progress]: [ 304 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.007 * * * * [progress]: [ 305 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.007 * * * * [progress]: [ 306 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.007 * * * * [progress]: [ 307 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.007 * * * * [progress]: [ 308 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.008 * * * * [progress]: [ 309 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.008 * * * * [progress]: [ 310 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.008 * * * * [progress]: [ 311 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.008 * * * * [progress]: [ 312 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.008 * * * * [progress]: [ 313 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.008 * * * * [progress]: [ 314 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.008 * * * * [progress]: [ 315 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.008 * * * * [progress]: [ 316 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.008 * * * * [progress]: [ 317 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.008 * * * * [progress]: [ 318 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.008 * * * * [progress]: [ 319 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.009 * * * * [progress]: [ 320 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.009 * * * * [progress]: [ 321 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.009 * * * * [progress]: [ 322 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.009 * * * * [progress]: [ 323 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.009 * * * * [progress]: [ 324 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.009 * * * * [progress]: [ 325 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.009 * * * * [progress]: [ 326 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.009 * * * * [progress]: [ 327 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.009 * * * * [progress]: [ 328 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.009 * * * * [progress]: [ 329 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
21.009 * * * * [progress]: [ 330 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
21.010 * * * * [progress]: [ 331 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.010 * * * * [progress]: [ 332 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
21.010 * * * * [progress]: [ 333 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.010 * * * * [progress]: [ 334 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.010 * * * * [progress]: [ 335 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
21.010 * * * * [progress]: [ 336 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
21.010 * * * * [progress]: [ 337 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.010 * * * * [progress]: [ 338 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.010 * * * * [progress]: [ 339 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.010 * * * * [progress]: [ 340 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.010 * * * * [progress]: [ 341 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (log (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
21.010 * * * * [progress]: [ 342 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (- (log (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
21.011 * * * * [progress]: [ 343 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (exp (log (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
21.011 * * * * [progress]: [ 344 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (log (exp (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
21.011 * * * * [progress]: [ 345 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.011 * * * * [progress]: [ 346 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.011 * * * * [progress]: [ 347 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.011 * * * * [progress]: [ 348 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.011 * * * * [progress]: [ 349 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.011 * * * * [progress]: [ 350 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.011 * * * * [progress]: [ 351 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.012 * * * * [progress]: [ 352 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.012 * * * * [progress]: [ 353 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.012 * * * * [progress]: [ 354 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.012 * * * * [progress]: [ 355 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.012 * * * * [progress]: [ 356 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.012 * * * * [progress]: [ 357 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.012 * * * * [progress]: [ 358 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.013 * * * * [progress]: [ 359 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.013 * * * * [progress]: [ 360 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.013 * * * * [progress]: [ 361 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.013 * * * * [progress]: [ 362 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.013 * * * * [progress]: [ 363 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.013 * * * * [progress]: [ 364 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.013 * * * * [progress]: [ 365 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.014 * * * * [progress]: [ 366 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.014 * * * * [progress]: [ 367 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.014 * * * * [progress]: [ 368 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.014 * * * * [progress]: [ 369 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.014 * * * * [progress]: [ 370 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.014 * * * * [progress]: [ 371 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.014 * * * * [progress]: [ 372 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.014 * * * * [progress]: [ 373 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.015 * * * * [progress]: [ 374 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.015 * * * * [progress]: [ 375 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.015 * * * * [progress]: [ 376 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.015 * * * * [progress]: [ 377 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.015 * * * * [progress]: [ 378 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.015 * * * * [progress]: [ 379 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.015 * * * * [progress]: [ 380 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.015 * * * * [progress]: [ 381 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.015 * * * * [progress]: [ 382 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.016 * * * * [progress]: [ 383 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.016 * * * * [progress]: [ 384 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.016 * * * * [progress]: [ 385 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.016 * * * * [progress]: [ 386 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.016 * * * * [progress]: [ 387 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.016 * * * * [progress]: [ 388 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.016 * * * * [progress]: [ 389 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.016 * * * * [progress]: [ 390 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.016 * * * * [progress]: [ 391 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.016 * * * * [progress]: [ 392 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.016 * * * * [progress]: [ 393 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.016 * * * * [progress]: [ 394 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.016 * * * * [progress]: [ 395 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.016 * * * * [progress]: [ 396 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.017 * * * * [progress]: [ 397 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.017 * * * * [progress]: [ 398 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.017 * * * * [progress]: [ 399 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.017 * * * * [progress]: [ 400 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.017 * * * * [progress]: [ 401 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.017 * * * * [progress]: [ 402 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.017 * * * * [progress]: [ 403 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.017 * * * * [progress]: [ 404 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.017 * * * * [progress]: [ 405 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.017 * * * * [progress]: [ 406 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.017 * * * * [progress]: [ 407 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.017 * * * * [progress]: [ 408 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.017 * * * * [progress]: [ 409 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.017 * * * * [progress]: [ 410 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.018 * * * * [progress]: [ 411 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.018 * * * * [progress]: [ 412 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.018 * * * * [progress]: [ 413 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.018 * * * * [progress]: [ 414 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.018 * * * * [progress]: [ 415 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.018 * * * * [progress]: [ 416 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.018 * * * * [progress]: [ 417 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.018 * * * * [progress]: [ 418 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.018 * * * * [progress]: [ 419 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.018 * * * * [progress]: [ 420 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.018 * * * * [progress]: [ 421 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.018 * * * * [progress]: [ 422 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.018 * * * * [progress]: [ 423 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.018 * * * * [progress]: [ 424 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.018 * * * * [progress]: [ 425 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.018 * * * * [progress]: [ 426 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.019 * * * * [progress]: [ 427 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.019 * * * * [progress]: [ 428 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.019 * * * * [progress]: [ 429 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.019 * * * * [progress]: [ 430 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.019 * * * * [progress]: [ 431 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.019 * * * * [progress]: [ 432 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.019 * * * * [progress]: [ 433 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.019 * * * * [progress]: [ 434 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.019 * * * * [progress]: [ 435 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.019 * * * * [progress]: [ 436 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.019 * * * * [progress]: [ 437 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.019 * * * * [progress]: [ 438 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.019 * * * * [progress]: [ 439 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.019 * * * * [progress]: [ 440 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.019 * * * * [progress]: [ 441 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.020 * * * * [progress]: [ 442 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.020 * * * * [progress]: [ 443 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.020 * * * * [progress]: [ 444 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.020 * * * * [progress]: [ 445 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.020 * * * * [progress]: [ 446 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.020 * * * * [progress]: [ 447 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.020 * * * * [progress]: [ 448 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.020 * * * * [progress]: [ 449 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.020 * * * * [progress]: [ 450 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.020 * * * * [progress]: [ 451 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.020 * * * * [progress]: [ 452 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.020 * * * * [progress]: [ 453 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.020 * * * * [progress]: [ 454 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.020 * * * * [progress]: [ 455 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.020 * * * * [progress]: [ 456 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.020 * * * * [progress]: [ 457 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.021 * * * * [progress]: [ 458 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.021 * * * * [progress]: [ 459 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.021 * * * * [progress]: [ 460 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.021 * * * * [progress]: [ 461 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.021 * * * * [progress]: [ 462 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.021 * * * * [progress]: [ 463 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.021 * * * * [progress]: [ 464 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.021 * * * * [progress]: [ 465 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.021 * * * * [progress]: [ 466 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.021 * * * * [progress]: [ 467 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.021 * * * * [progress]: [ 468 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.021 * * * * [progress]: [ 469 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.021 * * * * [progress]: [ 470 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.021 * * * * [progress]: [ 471 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
21.021 * * * * [progress]: [ 472 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
21.022 * * * * [progress]: [ 473 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (* (* (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))) (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))) (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
21.022 * * * * [progress]: [ 474 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (cbrt (* (* (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
21.022 * * * * [progress]: [ 475 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (* (sqrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))) (sqrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
21.022 * * * * [progress]: [ 476 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (- (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (- (* l 2)))))>
21.022 * * * * [progress]: [ 477 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) l) (/ (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) 2))))>
21.022 * * * * [progress]: [ 478 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (* 1 (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))))>
21.022 * * * * [progress]: [ 479 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (/ 1 (* l 2)))))>
21.022 * * * * [progress]: [ 480 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 1 (/ (* l 2) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))))))>
21.022 * * * * [progress]: [ 481 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) l) 2)))>
21.022 * * * * [progress]: [ 482 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))))>
21.022 * * * * [progress]: [ 483 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* M h))) (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))))))>
21.022 * * * * [progress]: [ 484 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d)))))))>
21.022 * * * * [progress]: [ 485 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d)))))))>
21.022 * * * * [progress]: [ 486 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* M (* M h))) (* (* l 2) (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d))))))))>
21.022 * * * * [progress]: [ 487 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* l 2) (* (sqrt h) (/ 2 (/ D d)))))))>
21.022 * * * * [progress]: [ 488 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (* (sqrt h) (/ 2 (/ D d)))))))>
21.022 * * * * [progress]: [ 489 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* M (* M h))) (* (* l 2) (* (sqrt (cbrt l)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))))))>
21.022 * * * * [progress]: [ 490 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* l 2) (* (sqrt (cbrt l)) (/ 2 (/ D d)))))))>
21.022 * * * * [progress]: [ 491 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (* (sqrt (cbrt l)) (/ 2 (/ D d)))))))>
21.022 * * * * [progress]: [ 492 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* M h))) (* (* l 2) (* (/ 2 (/ D d)) (/ 2 (/ D d)))))))>
21.022 * * * * [progress]: [ 493 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* l 2) (/ 2 (/ D d))))))>
21.023 * * * * [progress]: [ 494 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))>
21.023 * * * * [progress]: [ 495 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (* (sqrt (cbrt l)) (sqrt h))))))>
21.023 * * * * [progress]: [ 496 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))>
21.023 * * * * [progress]: [ 497 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt (cbrt l))))))>
21.023 * * * * [progress]: [ 498 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (posit16->real (real->posit16 (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
21.023 * * * * [progress]: [ 499 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* +nan.0 (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
21.023 * * * * [progress]: [ 500 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
21.023 * * * * [progress]: [ 501 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
21.023 * * * * [progress]: [ 502 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* +nan.0 (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
21.023 * * * * [progress]: [ 503 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
21.023 * * * * [progress]: [ 504 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
21.023 * * * * [progress]: [ 505 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 l) 1/6)))) (* l 2))))>
21.023 * * * * [progress]: [ 506 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))))))))) (* l 2))))>
21.023 * * * * [progress]: [ 507 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 l) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 l) 1/6))))))))) (* l 2))))>
21.023 * * * * [progress]: [ 508 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 (pow l 7)) 1/6))))))>
21.023 * * * * [progress]: [ 509 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))))))))>
21.023 * * * * [progress]: [ 510 / 510 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 (pow l 7)) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 (pow l 7)) 1/6)))))))))))>
21.032 * [simplify]: Simplifying:
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))
  (sqrt (* (cbrt (/ d h)) (cbrt (/ d h))))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  (sqrt (/ 1 1))
  (sqrt (/ d h))
  (sqrt 1)
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  (/ 1 2)
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))
  (sqrt (* (cbrt (/ d h)) (cbrt (/ d h))))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  (sqrt (/ 1 1))
  (sqrt (/ d h))
  (sqrt 1)
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  (/ 1 2)
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))
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  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (* (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))) (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))
  (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))
  (* (* (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))
  (sqrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))
  (sqrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))
  (- (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (- (* l 2))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) l)
  (/ (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) 2)
  (/ 1 (* l 2))
  (/ (* l 2) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) l)
  (/ (* l 2) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d)))))
  (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d))))
  (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d))))
  (* (* l 2) (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d)))))
  (* (* l 2) (* (sqrt h) (/ 2 (/ D d))))
  (* (* l 2) (* (sqrt h) (/ 2 (/ D d))))
  (* (* l 2) (* (sqrt (cbrt l)) (* (/ 2 (/ D d)) (/ 2 (/ D d)))))
  (* (* l 2) (* (sqrt (cbrt l)) (/ 2 (/ D d))))
  (* (* l 2) (* (sqrt (cbrt l)) (/ 2 (/ D d))))
  (* (* l 2) (* (/ 2 (/ D d)) (/ 2 (/ D d))))
  (* (* l 2) (/ 2 (/ D d)))
  (* (* l 2) (/ 2 (/ D d)))
  (* (* l 2) (* (sqrt (cbrt l)) (sqrt h)))
  (* (* l 2) (sqrt h))
  (* (* l 2) (sqrt (cbrt l)))
  (real->posit16 (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))
  (* +nan.0 (/ d h))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (* +nan.0 (/ d h))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 l) 1/6))))
  (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))))))
  (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 l) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 l) 1/6)))))))))
  (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 (pow l 7)) 1/6))))
  (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))))))
  (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 (pow l 7)) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 (pow l 7)) 1/6)))))))))
21.075 * * [simplify]: iteration 1: (754 enodes)
21.704 * * [simplify]: Extracting #0: cost 286 inf + 0
21.708 * * [simplify]: Extracting #1: cost 1055 inf + 2
21.716 * * [simplify]: Extracting #2: cost 1274 inf + 536
21.737 * * [simplify]: Extracting #3: cost 1330 inf + 8053
21.749 * * [simplify]: Extracting #4: cost 1290 inf + 29147
21.767 * * [simplify]: Extracting #5: cost 1154 inf + 89341
21.828 * * [simplify]: Extracting #6: cost 910 inf + 236543
21.982 * * [simplify]: Extracting #7: cost 564 inf + 566772
22.288 * * [simplify]: Extracting #8: cost 221 inf + 958176
22.633 * * [simplify]: Extracting #9: cost 99 inf + 1085120
23.024 * * [simplify]: Extracting #10: cost 30 inf + 1158619
23.451 * * [simplify]: Extracting #11: cost 4 inf + 1192909
23.859 * * [simplify]: Extracting #12: cost 0 inf + 1198775
24.223 * * [simplify]: Extracting #13: cost 0 inf + 1198575
24.652 * [simplify]: Simplified to:
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (/ d h) (sqrt (/ d h)))
  (fabs (cbrt (/ d h)))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (* (/ (cbrt d) (cbrt h)) (/ (cbrt d) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (* (cbrt d) (cbrt d)))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  1
  (sqrt (/ d h))
  1
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  1/2
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (/ d h) (sqrt (/ d h)))
  (fabs (cbrt (/ d h)))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (* (/ (cbrt d) (cbrt h)) (/ (cbrt d) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (* (cbrt d) (cbrt d)))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  1
  (sqrt (/ d h))
  1
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  1/2
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (exp (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))))
  (* (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (* (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))
  (* (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h)) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))))
  (* (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))) (* (* (/ d h) (sqrt (/ d h))) (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h)))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (* (/ M 2) (/ D d)) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))))
  (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))
  (* (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h)))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))
  (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h))
  (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (* (/ M 2) (/ D d)) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (cbrt (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (cbrt (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))))
  (cbrt (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))
  (sqrt (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (sqrt (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* M h) M) (* (sqrt d) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d)))))
  (* (sqrt (cbrt l)) (* (sqrt h) (* (* (/ 2 D) d) (* (/ 2 D) d))))
  (* (* (* (/ M 2) (/ D d)) (* M h)) (* (sqrt d) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d)))))
  (* (* (sqrt (cbrt l)) (sqrt h)) (* (/ 2 D) d))
  (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (* (sqrt d) (* (/ (* M h) (* (/ 2 D) d)) M)))
  (* (* (sqrt (cbrt l)) (sqrt h)) (* (/ 2 D) d))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt d) (* (* M h) M)))
  (* (sqrt h) (* (* (/ 2 D) d) (* (/ 2 D) d)))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt d) (* (* (/ M 2) (/ D d)) (* M h))))
  (/ (* (sqrt h) 2) (/ D d))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt d) (* (/ (* M h) (* (/ 2 D) d)) M)))
  (/ (* (sqrt h) 2) (/ D d))
  (* (* (* M h) M) (* (fabs (/ (cbrt d) (cbrt l))) (* (sqrt (cbrt d)) (sqrt (/ d h)))))
  (* (sqrt (cbrt l)) (* (* (/ 2 D) d) (* (/ 2 D) d)))
  (* (* (* (/ M 2) (/ D d)) (* M h)) (* (fabs (/ (cbrt d) (cbrt l))) (* (sqrt (cbrt d)) (sqrt (/ d h)))))
  (/ (* (sqrt (cbrt l)) 2) (/ D d))
  (* (* (/ (* M h) (* (/ 2 D) d)) M) (* (fabs (/ (cbrt d) (cbrt l))) (* (sqrt (cbrt d)) (sqrt (/ d h)))))
  (/ (* (sqrt (cbrt l)) 2) (/ D d))
  (* (* (/ M 2) (/ D d)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (sqrt (/ d h)) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (* M h) M)))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (* (/ M 2) (/ D d)) (* M h))))
  (* (* (/ (* M h) (* (/ 2 D) d)) M) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (sqrt d) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))
  (* (* (sqrt d) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))
  (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (* (sqrt (/ d h)) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))
  (real->posit16 (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
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  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (exp (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* 8 (* (* l l) l)))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* 8 (* (* l l) l)))
  (/ (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* l 2) (* l 2))) (* l 2))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l l) l)) (/ (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) 8))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l l) l)) (/ (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) 8))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* 8 (* (* l l) l)) (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d)))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d)))))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* 8 (* (* l l) l)))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l l) l)) (/ (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) 8))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l l) l)) (/ (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) 8))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* 8 (* (* l l) l)))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* 8 (* (* l l) l)) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* l 2)))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) (* 8 (* (* l l) l)))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* 8 (* (* l l) l)) (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))))
  (/ (/ (* (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h)))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* 8 (* (* l l) l)) (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* 8 (* (* l l) l)) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)))))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* 8 (* (* l l) l)) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)))))
  (/ (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* l l) l)) 8)
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* 8 (* (* l l) l)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* 8 (* (* l l) l)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))))
  (/ (/ (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h)))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* 8 (* (* l l) l)))
  (/ (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* l 2) (* l 2))) (* l 2))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l l) l)) (/ (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (* (/ M 2) (/ D d)) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))) 8))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l l) l)) (/ (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) 8))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))))
  (/ (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* l l) l)) 8)
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* l 2)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* 8 (* (* l l) l)) (* (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))))) (* 8 (* (* l l) l)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))))
  (/ (* (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* 8 (* (* l l) l)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h))))
  (/ (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d)))) (* (* l l) l)) 8)
  (/ (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d)))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* 8 (* (* l l) l)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* 8 (* (* l l) l)))
  (/ (* (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (/ (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))) (* (* (/ d h) (sqrt (/ d h))) (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))) (* (* l l) l)) 8)
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* 8 (* (* l l) l)))
  (/ (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* l 2) (* l 2))) (* l 2))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l l) l)) (/ (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) 8))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* l 2)))
  (/ (* (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* 8 (* (* l l) l)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l l) l)) (/ (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) 8))
  (/ (/ (* (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h))) (* 8 (* (* l l) l)))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h)) (* l 2)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* 8 (* (* l l) l)) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)))))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* 8 (* (* l l) l)))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* l 2)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* 8 (* (* l l) l)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* 8 (* (* l l) l)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))))
  (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))))) (* (* l 2) (* (* l 2) (* l 2))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l l) l)) (/ (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) 8))
  (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* 8 (* (* l l) l)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* 8 (* (* l l) l)) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (* (/ M 2) (/ D d)) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (* (/ M 2) (/ D d)) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))) (* l 2)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* 8 (* (* l l) l)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* l 2)))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* 8 (* (* l l) l)) (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))))))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* l 2)))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* 8 (* (* l l) l)))
  (/ (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* l 2) (* l 2))) (* l 2))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) 8))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) (* l 2)))
  (/ (* (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* 8 (* (* l l) l)))
  (/ (* (* (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (/ (* (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* l l) l)) 8)
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l 2) (* (* l 2) (* l 2))) (/ (* (* (* M M) M) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d))))) (* (/ 8 (* D (* D D))) (* (* d d) d)))))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* 8 (* (* l l) l)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* l 2)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) 8))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* l 2)))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* 8 (* (* l l) l)) (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d))))) (* l 2)))
  (/ (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* 8 (* (* l l) l)))
  (/ (/ (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* 8 (* (* l l) l)) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* 8 (* (* l l) l)) (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))))
  (/ (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* (* M M) M) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* 8 (* (* l l) l)) (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))))
  (/ (/ (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* (* h h) h)) (* (/ 4 (* (/ D d) (/ D d))) (* (/ 2 D) d)))) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))) (* (* l 2) (* l 2))) (* l 2))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h)) 8))
  (/ (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* h h) h))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* 8 (* (* l l) l)))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* 8 (* (* l l) l)) (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M)))))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))) (/ (* M M) (/ (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)) M))) (* l 2)))
  (/ (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* l l) l)) 8)
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (/ (* D (* D D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* 8 (* (* l l) l)))
  (/ (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* h h) h) (* (/ (* (* M M) M) 8) (* (/ D d) (* (/ D d) (/ D d)))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* 8 (* (* l l) l)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d))))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (/ (* (* (* M M) M) (* (* h h) h)) (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* (/ 2 D) d)))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* 8 (* (* l l) l)))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d)))) (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (/ M 2) (/ D d))) (* h h)) h)) (* (* l 2) (* (* l 2) (* l 2))))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (* (/ M 2) (/ D d)) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))) 8))
  (/ (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) (* (* (/ M 2) (/ D d)) (* (/ (* M h) (* (/ 2 D) d)) (* (/ (* M h) (* (/ 2 D) d)) (/ (* M h) (* (/ 2 D) d)))))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* 8 (* (* l l) l)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))))
  (/ (* (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)) (* 8 (* (* l l) l)))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)) (* (* l 2) (* (* l 2) (* l 2))))
  (* (cbrt (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))) (cbrt (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))))
  (cbrt (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (* (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (* (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))) (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))))
  (sqrt (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (sqrt (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (- (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))
  (* l -2)
  (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) l)
  (/ (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h) 2)
  (/ 1 (* l 2))
  (/ (/ (* l 2) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))
  (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h)))
  (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))
  (* (* l (* 2 (* (sqrt (cbrt l)) (sqrt h)))) (* (* (/ 2 D) d) (* (/ 2 D) d)))
  (* (* l (* 2 (* (sqrt (cbrt l)) (sqrt h)))) (* (/ 2 D) d))
  (* (* l (* 2 (* (sqrt (cbrt l)) (sqrt h)))) (* (/ 2 D) d))
  (* (* l (* 2 (sqrt h))) (* (* (/ 2 D) d) (* (/ 2 D) d)))
  (* (* l 2) (/ (* (sqrt h) 2) (/ D d)))
  (* (* l 2) (/ (* (sqrt h) 2) (/ D d)))
  (* (* l (* 2 (sqrt (cbrt l)))) (* (* (/ 2 D) d) (* (/ 2 D) d)))
  (* (* l 2) (/ (* (sqrt (cbrt l)) 2) (/ D d)))
  (* (* l 2) (/ (* (sqrt (cbrt l)) 2) (/ D d)))
  (* (* (* (/ 2 D) d) (* (/ 2 D) d)) (* l 2))
  (/ (* (* l 2) 2) (/ D d))
  (/ (* (* l 2) 2) (/ D d))
  (* l (* 2 (* (sqrt (cbrt l)) (sqrt h))))
  (* l (* 2 (sqrt h)))
  (* l (* 2 (sqrt (cbrt l))))
  (real->posit16 (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (* (* (/ M 2) (/ D d)) (* (/ M 2) (/ D d))) h))))
  (/ (* +nan.0 d) h)
  (- (- (* (/ 1 (* (* (* h h) h) (* d d))) +nan.0) (- (/ (* +nan.0 1) (* d (* h h))) (* +nan.0 (/ 1 h)))))
  (- (- (* (/ 1 (* (* (* h h) h) (* d d))) +nan.0) (- (/ (* +nan.0 1) (* d (* h h))) (* +nan.0 (/ 1 h)))))
  (/ (* +nan.0 d) h)
  (- (- (* (/ 1 (* (* (* h h) h) (* d d))) +nan.0) (- (/ (* +nan.0 1) (* d (* h h))) (* +nan.0 (/ 1 h)))))
  (- (- (* (/ 1 (* (* (* h h) h) (* d d))) +nan.0) (- (/ (* +nan.0 1) (* d (* h h))) (* +nan.0 (/ 1 h)))))
  (* (* (* (* h (* M M)) (* (* D D) (fabs (cbrt (/ d l))))) (* (pow (/ 1 l) 1/6) (cbrt (/ 1 (* (* d d) (* d d)))))) +nan.0)
  (- (- (* (* (* (pow (/ 1 l) 1/6) (cbrt (/ 1 (* (* d d) (* d d))))) (/ (fabs (cbrt (/ d l))) (/ h (* (* D D) (* M M))))) +nan.0) (- (* (* (/ (fabs (cbrt (/ d l))) (/ (* h h) (* (* D D) (* M M)))) (* (pow (/ 1 l) 1/6) (cbrt (/ 1 (* (* d d) (* d d)))))) +nan.0) (* (* (* (* (cbrt (/ 1 (* (* d d) (* d d)))) (* M M)) (* (* D D) (fabs (cbrt (/ d l))))) (pow (/ 1 l) 1/6)) +nan.0))))
  (- (- (* (* +nan.0 (cbrt (/ 1 (* (* d d) (* d d))))) (* (pow (/ -1 l) 1/6) (/ (fabs (cbrt (/ d l))) (/ (* h h) (* (* D D) (* M M)))))) (- (* (* +nan.0 (pow (/ -1 l) 1/6)) (* (* (cbrt (/ 1 (* (* d d) (* d d)))) (* M M)) (* (* D D) (fabs (cbrt (/ d l)))))) (* (* +nan.0 (cbrt (/ 1 (* (* d d) (* d d))))) (* (/ (fabs (cbrt (/ d l))) (/ h (* (* D D) (* M M)))) (pow (/ -1 l) 1/6))))))
  (* (* (* (cbrt (/ 1 (* (* d d) (* d d)))) (pow (/ 1 (pow l 7)) 1/6)) (* (* h (* M M)) (* (* D D) (fabs (cbrt (/ d l)))))) +nan.0)
  (- (- (* (* +nan.0 (/ (fabs (cbrt (/ d l))) (/ (* h h) (* (* D D) (* M M))))) (* (cbrt (/ 1 (* (* d d) (* d d)))) (pow (/ 1 (pow l 7)) 1/6))) (- (* (* (* (/ (fabs (cbrt (/ d l))) (/ h (* (* D D) (* M M)))) (pow (/ 1 (pow l 7)) 1/6)) (cbrt (/ 1 (* (* d d) (* d d))))) +nan.0) (* (* +nan.0 (cbrt (/ 1 (* (* d d) (* d d))))) (* (* (* (* D D) (* M M)) (fabs (cbrt (/ d l)))) (pow (/ 1 (pow l 7)) 1/6))))))
  (- (- (* (* +nan.0 (cbrt (/ 1 (* (* d d) (* d d))))) (* (pow (/ -1 (pow l 7)) 1/6) (/ (fabs (cbrt (/ d l))) (/ h (* (* D D) (* M M)))))) (- (* (* (* (* (cbrt (/ 1 (* (* d d) (* d d)))) (* M M)) (* (* D D) (fabs (cbrt (/ d l))))) (pow (/ -1 (pow l 7)) 1/6)) +nan.0) (* (* +nan.0 (cbrt (/ 1 (* (* d d) (* d d))))) (* (pow (/ -1 (pow l 7)) 1/6) (/ (fabs (cbrt (/ d l))) (/ (* h h) (* (* D D) (* M M)))))))))
24.854 * * * [progress]: adding candidates to table
38.848 * * [progress]: iteration 4 / 4
38.849 * * * [progress]: picking best candidate
39.097 * * * * [pick]: Picked  #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
39.097 * * * [progress]: localizing error
39.247 * * * [progress]: generating rewritten candidates
39.247 * * * * [progress]: [ 1 / 4 ] rewriting at (2 2 1 1 2)
39.251 * * * * [progress]: [ 2 / 4 ] rewriting at (2 2 1)
39.507 * * * * [progress]: [ 3 / 4 ] rewriting at (2 2)
39.798 * * * * [progress]: [ 4 / 4 ] rewriting at (2 2 1 2 2 1)
39.860 * * * [progress]: generating series expansions
39.860 * * * * [progress]: [ 1 / 4 ] generating series at (2 2 1 1 2)
39.860 * [backup-simplify]: Simplify (sqrt (/ d h)) into (sqrt (/ d h))
39.860 * [approximate]: Taking taylor expansion of (sqrt (/ d h)) in (d h) around 0
39.860 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in h
39.860 * [taylor]: Taking taylor expansion of (/ d h) in h
39.860 * [taylor]: Taking taylor expansion of d in h
39.860 * [backup-simplify]: Simplify d into d
39.860 * [taylor]: Taking taylor expansion of h in h
39.860 * [backup-simplify]: Simplify 0 into 0
39.860 * [backup-simplify]: Simplify 1 into 1
39.860 * [backup-simplify]: Simplify (/ d 1) into d
39.861 * [backup-simplify]: Simplify (sqrt 0) into 0
39.861 * [backup-simplify]: Simplify (/ d (* 2 (sqrt 0))) into (* +nan.0 d)
39.861 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
39.861 * [taylor]: Taking taylor expansion of (/ d h) in d
39.861 * [taylor]: Taking taylor expansion of d in d
39.862 * [backup-simplify]: Simplify 0 into 0
39.862 * [backup-simplify]: Simplify 1 into 1
39.862 * [taylor]: Taking taylor expansion of h in d
39.862 * [backup-simplify]: Simplify h into h
39.862 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
39.862 * [backup-simplify]: Simplify (sqrt 0) into 0
39.862 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
39.862 * [taylor]: Taking taylor expansion of (sqrt (/ d h)) in d
39.862 * [taylor]: Taking taylor expansion of (/ d h) in d
39.862 * [taylor]: Taking taylor expansion of d in d
39.862 * [backup-simplify]: Simplify 0 into 0
39.862 * [backup-simplify]: Simplify 1 into 1
39.862 * [taylor]: Taking taylor expansion of h in d
39.862 * [backup-simplify]: Simplify h into h
39.862 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
39.863 * [backup-simplify]: Simplify (sqrt 0) into 0
39.863 * [backup-simplify]: Simplify (/ (/ 1 h) (* 2 (sqrt 0))) into (/ +nan.0 h)
39.863 * [taylor]: Taking taylor expansion of 0 in h
39.863 * [backup-simplify]: Simplify 0 into 0
39.863 * [taylor]: Taking taylor expansion of (/ +nan.0 h) in h
39.863 * [taylor]: Taking taylor expansion of +nan.0 in h
39.863 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.863 * [taylor]: Taking taylor expansion of h in h
39.863 * [backup-simplify]: Simplify 0 into 0
39.863 * [backup-simplify]: Simplify 1 into 1
39.863 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
39.863 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.863 * [backup-simplify]: Simplify 0 into 0
39.864 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)))) into 0
39.864 * [backup-simplify]: Simplify (/ (- 0 (pow (/ +nan.0 h) 2) (+)) (* 2 0)) into (/ +nan.0 (pow h 2))
39.864 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 2)) in h
39.864 * [taylor]: Taking taylor expansion of +nan.0 in h
39.864 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.864 * [taylor]: Taking taylor expansion of (pow h 2) in h
39.864 * [taylor]: Taking taylor expansion of h in h
39.864 * [backup-simplify]: Simplify 0 into 0
39.864 * [backup-simplify]: Simplify 1 into 1
39.864 * [backup-simplify]: Simplify (* 1 1) into 1
39.865 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
39.865 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
39.866 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
39.866 * [backup-simplify]: Simplify 0 into 0
39.866 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
39.866 * [backup-simplify]: Simplify 0 into 0
39.866 * [backup-simplify]: Simplify 0 into 0
39.866 * [backup-simplify]: Simplify (- (/ 0 h) (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
39.867 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (/ +nan.0 h) (/ +nan.0 (pow h 2)))))) (* 2 0)) into (/ +nan.0 (pow h 3))
39.867 * [taylor]: Taking taylor expansion of (/ +nan.0 (pow h 3)) in h
39.867 * [taylor]: Taking taylor expansion of +nan.0 in h
39.867 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.867 * [taylor]: Taking taylor expansion of (pow h 3) in h
39.867 * [taylor]: Taking taylor expansion of h in h
39.867 * [backup-simplify]: Simplify 0 into 0
39.867 * [backup-simplify]: Simplify 1 into 1
39.867 * [backup-simplify]: Simplify (* 1 1) into 1
39.867 * [backup-simplify]: Simplify (* 1 1) into 1
39.868 * [backup-simplify]: Simplify (/ +nan.0 1) into +nan.0
39.868 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
39.869 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
39.869 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
39.869 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
39.870 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)))) into 0
39.871 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.871 * [backup-simplify]: Simplify 0 into 0
39.871 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
39.872 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* +nan.0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.872 * [backup-simplify]: Simplify 0 into 0
39.872 * [backup-simplify]: Simplify (* +nan.0 (* (/ 1 h) d)) into (* +nan.0 (/ d h))
39.872 * [backup-simplify]: Simplify (sqrt (/ (/ 1 d) (/ 1 h))) into (sqrt (/ h d))
39.872 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
39.872 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
39.872 * [taylor]: Taking taylor expansion of (/ h d) in h
39.872 * [taylor]: Taking taylor expansion of h in h
39.872 * [backup-simplify]: Simplify 0 into 0
39.872 * [backup-simplify]: Simplify 1 into 1
39.872 * [taylor]: Taking taylor expansion of d in h
39.872 * [backup-simplify]: Simplify d into d
39.872 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
39.872 * [backup-simplify]: Simplify (sqrt 0) into 0
39.873 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
39.873 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
39.873 * [taylor]: Taking taylor expansion of (/ h d) in d
39.873 * [taylor]: Taking taylor expansion of h in d
39.873 * [backup-simplify]: Simplify h into h
39.873 * [taylor]: Taking taylor expansion of d in d
39.873 * [backup-simplify]: Simplify 0 into 0
39.873 * [backup-simplify]: Simplify 1 into 1
39.873 * [backup-simplify]: Simplify (/ h 1) into h
39.873 * [backup-simplify]: Simplify (sqrt 0) into 0
39.873 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
39.873 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
39.873 * [taylor]: Taking taylor expansion of (/ h d) in d
39.873 * [taylor]: Taking taylor expansion of h in d
39.873 * [backup-simplify]: Simplify h into h
39.873 * [taylor]: Taking taylor expansion of d in d
39.873 * [backup-simplify]: Simplify 0 into 0
39.873 * [backup-simplify]: Simplify 1 into 1
39.874 * [backup-simplify]: Simplify (/ h 1) into h
39.874 * [backup-simplify]: Simplify (sqrt 0) into 0
39.874 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
39.874 * [taylor]: Taking taylor expansion of 0 in h
39.874 * [backup-simplify]: Simplify 0 into 0
39.874 * [backup-simplify]: Simplify 0 into 0
39.874 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
39.874 * [taylor]: Taking taylor expansion of +nan.0 in h
39.874 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.874 * [taylor]: Taking taylor expansion of h in h
39.874 * [backup-simplify]: Simplify 0 into 0
39.874 * [backup-simplify]: Simplify 1 into 1
39.875 * [backup-simplify]: Simplify (* +nan.0 0) into 0
39.875 * [backup-simplify]: Simplify 0 into 0
39.875 * [backup-simplify]: Simplify 0 into 0
39.875 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
39.876 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
39.876 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
39.876 * [taylor]: Taking taylor expansion of +nan.0 in h
39.876 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.876 * [taylor]: Taking taylor expansion of (pow h 2) in h
39.876 * [taylor]: Taking taylor expansion of h in h
39.876 * [backup-simplify]: Simplify 0 into 0
39.876 * [backup-simplify]: Simplify 1 into 1
39.877 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
39.877 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
39.877 * [backup-simplify]: Simplify 0 into 0
39.878 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.878 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
39.878 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
39.878 * [taylor]: Taking taylor expansion of +nan.0 in h
39.878 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.878 * [taylor]: Taking taylor expansion of (pow h 3) in h
39.878 * [taylor]: Taking taylor expansion of h in h
39.878 * [backup-simplify]: Simplify 0 into 0
39.878 * [backup-simplify]: Simplify 1 into 1
39.879 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
39.879 * [backup-simplify]: Simplify 0 into 0
39.879 * [backup-simplify]: Simplify 0 into 0
39.880 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.881 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
39.881 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
39.881 * [taylor]: Taking taylor expansion of +nan.0 in h
39.881 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.881 * [taylor]: Taking taylor expansion of (pow h 4) in h
39.881 * [taylor]: Taking taylor expansion of h in h
39.881 * [backup-simplify]: Simplify 0 into 0
39.881 * [backup-simplify]: Simplify 1 into 1
39.881 * [backup-simplify]: Simplify (* 1 1) into 1
39.881 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
39.881 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.882 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
39.882 * [backup-simplify]: Simplify 0 into 0
39.882 * [backup-simplify]: Simplify 0 into 0
39.883 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.884 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
39.884 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
39.884 * [taylor]: Taking taylor expansion of +nan.0 in h
39.884 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.884 * [taylor]: Taking taylor expansion of (pow h 5) in h
39.884 * [taylor]: Taking taylor expansion of h in h
39.884 * [backup-simplify]: Simplify 0 into 0
39.884 * [backup-simplify]: Simplify 1 into 1
39.885 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
39.885 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
39.885 * [backup-simplify]: Simplify 0 into 0
39.886 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
39.886 * [backup-simplify]: Simplify 0 into 0
39.886 * [backup-simplify]: Simplify 0 into 0
39.887 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.888 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
39.888 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
39.888 * [taylor]: Taking taylor expansion of +nan.0 in h
39.888 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.888 * [taylor]: Taking taylor expansion of (pow h 6) in h
39.888 * [taylor]: Taking taylor expansion of h in h
39.888 * [backup-simplify]: Simplify 0 into 0
39.888 * [backup-simplify]: Simplify 1 into 1
39.889 * [backup-simplify]: Simplify (* 1 1) into 1
39.889 * [backup-simplify]: Simplify (* 1 1) into 1
39.889 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
39.889 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.890 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 h) 3) (pow (/ 1 d) 2))) (+ (* +nan.0 (* (pow (/ 1 h) 2) (/ 1 d))) (* (- +nan.0) (* (/ 1 h) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
39.890 * [backup-simplify]: Simplify (sqrt (/ (/ 1 (- d)) (/ 1 (- h)))) into (sqrt (/ h d))
39.890 * [approximate]: Taking taylor expansion of (sqrt (/ h d)) in (d h) around 0
39.890 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in h
39.890 * [taylor]: Taking taylor expansion of (/ h d) in h
39.890 * [taylor]: Taking taylor expansion of h in h
39.890 * [backup-simplify]: Simplify 0 into 0
39.890 * [backup-simplify]: Simplify 1 into 1
39.890 * [taylor]: Taking taylor expansion of d in h
39.890 * [backup-simplify]: Simplify d into d
39.890 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
39.890 * [backup-simplify]: Simplify (sqrt 0) into 0
39.891 * [backup-simplify]: Simplify (/ (/ 1 d) (* 2 (sqrt 0))) into (/ +nan.0 d)
39.891 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
39.891 * [taylor]: Taking taylor expansion of (/ h d) in d
39.891 * [taylor]: Taking taylor expansion of h in d
39.891 * [backup-simplify]: Simplify h into h
39.891 * [taylor]: Taking taylor expansion of d in d
39.891 * [backup-simplify]: Simplify 0 into 0
39.891 * [backup-simplify]: Simplify 1 into 1
39.891 * [backup-simplify]: Simplify (/ h 1) into h
39.891 * [backup-simplify]: Simplify (sqrt 0) into 0
39.891 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
39.891 * [taylor]: Taking taylor expansion of (sqrt (/ h d)) in d
39.891 * [taylor]: Taking taylor expansion of (/ h d) in d
39.891 * [taylor]: Taking taylor expansion of h in d
39.891 * [backup-simplify]: Simplify h into h
39.891 * [taylor]: Taking taylor expansion of d in d
39.891 * [backup-simplify]: Simplify 0 into 0
39.891 * [backup-simplify]: Simplify 1 into 1
39.891 * [backup-simplify]: Simplify (/ h 1) into h
39.892 * [backup-simplify]: Simplify (sqrt 0) into 0
39.893 * [backup-simplify]: Simplify (/ h (* 2 (sqrt 0))) into (* +nan.0 h)
39.893 * [taylor]: Taking taylor expansion of 0 in h
39.893 * [backup-simplify]: Simplify 0 into 0
39.893 * [backup-simplify]: Simplify 0 into 0
39.893 * [taylor]: Taking taylor expansion of (* +nan.0 h) in h
39.893 * [taylor]: Taking taylor expansion of +nan.0 in h
39.893 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.893 * [taylor]: Taking taylor expansion of h in h
39.893 * [backup-simplify]: Simplify 0 into 0
39.893 * [backup-simplify]: Simplify 1 into 1
39.893 * [backup-simplify]: Simplify (* +nan.0 0) into 0
39.893 * [backup-simplify]: Simplify 0 into 0
39.894 * [backup-simplify]: Simplify 0 into 0
39.894 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)))) into 0
39.895 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 h) 2) (+)) (* 2 0)) into (* +nan.0 (pow h 2))
39.895 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 2)) in h
39.895 * [taylor]: Taking taylor expansion of +nan.0 in h
39.895 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.895 * [taylor]: Taking taylor expansion of (pow h 2) in h
39.895 * [taylor]: Taking taylor expansion of h in h
39.895 * [backup-simplify]: Simplify 0 into 0
39.895 * [backup-simplify]: Simplify 1 into 1
39.896 * [backup-simplify]: Simplify (+ (* +nan.0 1) (* 0 0)) into (- +nan.0)
39.896 * [backup-simplify]: Simplify (- +nan.0) into (- +nan.0)
39.896 * [backup-simplify]: Simplify 0 into 0
39.897 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.897 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 2)))))) (* 2 0)) into (* +nan.0 (pow h 3))
39.897 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 3)) in h
39.897 * [taylor]: Taking taylor expansion of +nan.0 in h
39.897 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.897 * [taylor]: Taking taylor expansion of (pow h 3) in h
39.897 * [taylor]: Taking taylor expansion of h in h
39.897 * [backup-simplify]: Simplify 0 into 0
39.897 * [backup-simplify]: Simplify 1 into 1
39.898 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 1) (* 0 0))) into 0
39.898 * [backup-simplify]: Simplify 0 into 0
39.898 * [backup-simplify]: Simplify 0 into 0
39.899 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.900 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 2)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 4))
39.900 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 4)) in h
39.900 * [taylor]: Taking taylor expansion of +nan.0 in h
39.900 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.900 * [taylor]: Taking taylor expansion of (pow h 4) in h
39.900 * [taylor]: Taking taylor expansion of h in h
39.900 * [backup-simplify]: Simplify 0 into 0
39.900 * [backup-simplify]: Simplify 1 into 1
39.900 * [backup-simplify]: Simplify (* 1 1) into 1
39.900 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
39.900 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.901 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
39.901 * [backup-simplify]: Simplify 0 into 0
39.901 * [backup-simplify]: Simplify 0 into 0
39.902 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.903 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 4)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 3)))))) (* 2 0)) into (* +nan.0 (pow h 5))
39.903 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 5)) in h
39.903 * [taylor]: Taking taylor expansion of +nan.0 in h
39.903 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.903 * [taylor]: Taking taylor expansion of (pow h 5) in h
39.903 * [taylor]: Taking taylor expansion of h in h
39.903 * [backup-simplify]: Simplify 0 into 0
39.903 * [backup-simplify]: Simplify 1 into 1
39.904 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
39.904 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 1)) into 0
39.904 * [backup-simplify]: Simplify 0 into 0
39.905 * [backup-simplify]: Simplify (+ (* +nan.0 0) (+ (* 0 0) (+ (* 0 0) (+ (* 0 1) (* 0 0))))) into 0
39.905 * [backup-simplify]: Simplify 0 into 0
39.905 * [backup-simplify]: Simplify 0 into 0
39.907 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* h (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.907 * [backup-simplify]: Simplify (/ (- 0 (pow (* +nan.0 (pow h 3)) 2) (+ (* 2 (* (* +nan.0 h) (* +nan.0 (pow h 5)))) (* 2 (* (* +nan.0 (pow h 2)) (* +nan.0 (pow h 4)))))) (* 2 0)) into (* +nan.0 (pow h 6))
39.907 * [taylor]: Taking taylor expansion of (* +nan.0 (pow h 6)) in h
39.907 * [taylor]: Taking taylor expansion of +nan.0 in h
39.907 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.907 * [taylor]: Taking taylor expansion of (pow h 6) in h
39.907 * [taylor]: Taking taylor expansion of h in h
39.908 * [backup-simplify]: Simplify 0 into 0
39.908 * [backup-simplify]: Simplify 1 into 1
39.908 * [backup-simplify]: Simplify (* 1 1) into 1
39.918 * [backup-simplify]: Simplify (* 1 1) into 1
39.919 * [backup-simplify]: Simplify (* +nan.0 1) into +nan.0
39.919 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.919 * [backup-simplify]: Simplify (+ (* +nan.0 (* (pow (/ 1 (- h)) 3) (pow (/ 1 (- d)) 2))) (+ (* +nan.0 (* (pow (/ 1 (- h)) 2) (/ 1 (- d)))) (* (- +nan.0) (* (/ 1 (- h)) 1)))) into (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
39.919 * * * * [progress]: [ 2 / 4 ] generating series at (2 2 1)
39.920 * [backup-simplify]: Simplify (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) into (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))))
39.920 * [approximate]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in (d l h M D) around 0
39.920 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in D
39.920 * [taylor]: Taking taylor expansion of 1/4 in D
39.920 * [backup-simplify]: Simplify 1/4 into 1/4
39.920 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in D
39.920 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in D
39.920 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in D
39.920 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in D
39.920 * [taylor]: Taking taylor expansion of 1/6 in D
39.920 * [backup-simplify]: Simplify 1/6 into 1/6
39.920 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in D
39.920 * [taylor]: Taking taylor expansion of (/ 1 l) in D
39.920 * [taylor]: Taking taylor expansion of l in D
39.920 * [backup-simplify]: Simplify l into l
39.920 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
39.920 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
39.920 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
39.920 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
39.920 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in D
39.920 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in D
39.920 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in D
39.920 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in D
39.920 * [taylor]: Taking taylor expansion of 1/3 in D
39.920 * [backup-simplify]: Simplify 1/3 into 1/3
39.920 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in D
39.921 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in D
39.921 * [taylor]: Taking taylor expansion of (pow d 4) in D
39.921 * [taylor]: Taking taylor expansion of d in D
39.921 * [backup-simplify]: Simplify d into d
39.921 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.921 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.921 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
39.921 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
39.921 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
39.921 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
39.921 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in D
39.921 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in D
39.921 * [taylor]: Taking taylor expansion of (pow M 2) in D
39.921 * [taylor]: Taking taylor expansion of M in D
39.921 * [backup-simplify]: Simplify M into M
39.921 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in D
39.921 * [taylor]: Taking taylor expansion of (pow D 2) in D
39.921 * [taylor]: Taking taylor expansion of D in D
39.921 * [backup-simplify]: Simplify 0 into 0
39.921 * [backup-simplify]: Simplify 1 into 1
39.921 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in D
39.921 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.921 * [taylor]: Taking taylor expansion of (sqrt h) in D
39.921 * [taylor]: Taking taylor expansion of h in D
39.921 * [backup-simplify]: Simplify h into h
39.921 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
39.921 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
39.921 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in M
39.921 * [taylor]: Taking taylor expansion of 1/4 in M
39.921 * [backup-simplify]: Simplify 1/4 into 1/4
39.921 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in M
39.921 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in M
39.921 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in M
39.921 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in M
39.921 * [taylor]: Taking taylor expansion of 1/6 in M
39.921 * [backup-simplify]: Simplify 1/6 into 1/6
39.921 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in M
39.922 * [taylor]: Taking taylor expansion of (/ 1 l) in M
39.922 * [taylor]: Taking taylor expansion of l in M
39.922 * [backup-simplify]: Simplify l into l
39.922 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
39.922 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
39.922 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
39.922 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
39.922 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in M
39.922 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in M
39.922 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in M
39.922 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in M
39.922 * [taylor]: Taking taylor expansion of 1/3 in M
39.922 * [backup-simplify]: Simplify 1/3 into 1/3
39.922 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in M
39.922 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in M
39.922 * [taylor]: Taking taylor expansion of (pow d 4) in M
39.922 * [taylor]: Taking taylor expansion of d in M
39.922 * [backup-simplify]: Simplify d into d
39.922 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.922 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.922 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
39.922 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
39.922 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
39.922 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
39.922 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in M
39.922 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in M
39.922 * [taylor]: Taking taylor expansion of (pow M 2) in M
39.922 * [taylor]: Taking taylor expansion of M in M
39.922 * [backup-simplify]: Simplify 0 into 0
39.922 * [backup-simplify]: Simplify 1 into 1
39.922 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in M
39.922 * [taylor]: Taking taylor expansion of (pow D 2) in M
39.922 * [taylor]: Taking taylor expansion of D in M
39.922 * [backup-simplify]: Simplify D into D
39.922 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in M
39.922 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.923 * [taylor]: Taking taylor expansion of (sqrt h) in M
39.923 * [taylor]: Taking taylor expansion of h in M
39.923 * [backup-simplify]: Simplify h into h
39.923 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
39.923 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
39.923 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in h
39.923 * [taylor]: Taking taylor expansion of 1/4 in h
39.923 * [backup-simplify]: Simplify 1/4 into 1/4
39.923 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in h
39.923 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in h
39.923 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in h
39.923 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in h
39.923 * [taylor]: Taking taylor expansion of 1/6 in h
39.923 * [backup-simplify]: Simplify 1/6 into 1/6
39.923 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in h
39.923 * [taylor]: Taking taylor expansion of (/ 1 l) in h
39.923 * [taylor]: Taking taylor expansion of l in h
39.923 * [backup-simplify]: Simplify l into l
39.923 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
39.923 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
39.923 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
39.923 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
39.923 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in h
39.923 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in h
39.923 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in h
39.923 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in h
39.923 * [taylor]: Taking taylor expansion of 1/3 in h
39.923 * [backup-simplify]: Simplify 1/3 into 1/3
39.923 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in h
39.923 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in h
39.923 * [taylor]: Taking taylor expansion of (pow d 4) in h
39.923 * [taylor]: Taking taylor expansion of d in h
39.923 * [backup-simplify]: Simplify d into d
39.923 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.923 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.923 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
39.923 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
39.923 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
39.924 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
39.924 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in h
39.924 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in h
39.924 * [taylor]: Taking taylor expansion of (pow M 2) in h
39.924 * [taylor]: Taking taylor expansion of M in h
39.924 * [backup-simplify]: Simplify M into M
39.924 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in h
39.924 * [taylor]: Taking taylor expansion of (pow D 2) in h
39.924 * [taylor]: Taking taylor expansion of D in h
39.924 * [backup-simplify]: Simplify D into D
39.924 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in h
39.924 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.924 * [taylor]: Taking taylor expansion of (sqrt h) in h
39.924 * [taylor]: Taking taylor expansion of h in h
39.924 * [backup-simplify]: Simplify 0 into 0
39.924 * [backup-simplify]: Simplify 1 into 1
39.924 * [backup-simplify]: Simplify (sqrt 0) into 0
39.925 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
39.925 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in l
39.925 * [taylor]: Taking taylor expansion of 1/4 in l
39.925 * [backup-simplify]: Simplify 1/4 into 1/4
39.925 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in l
39.925 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in l
39.925 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in l
39.925 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in l
39.925 * [taylor]: Taking taylor expansion of 1/6 in l
39.925 * [backup-simplify]: Simplify 1/6 into 1/6
39.925 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in l
39.925 * [taylor]: Taking taylor expansion of (/ 1 l) in l
39.925 * [taylor]: Taking taylor expansion of l in l
39.926 * [backup-simplify]: Simplify 0 into 0
39.926 * [backup-simplify]: Simplify 1 into 1
39.926 * [backup-simplify]: Simplify (/ 1 1) into 1
39.926 * [backup-simplify]: Simplify (log 1) into 0
39.926 * [backup-simplify]: Simplify (+ (* (- 1) (log l)) 0) into (- (log l))
39.926 * [backup-simplify]: Simplify (* 1/6 (- (log l))) into (* -1/6 (log l))
39.926 * [backup-simplify]: Simplify (exp (* -1/6 (log l))) into (pow l -1/6)
39.926 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in l
39.927 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in l
39.927 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in l
39.927 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in l
39.927 * [taylor]: Taking taylor expansion of 1/3 in l
39.927 * [backup-simplify]: Simplify 1/3 into 1/3
39.927 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in l
39.927 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in l
39.927 * [taylor]: Taking taylor expansion of (pow d 4) in l
39.927 * [taylor]: Taking taylor expansion of d in l
39.927 * [backup-simplify]: Simplify d into d
39.927 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.927 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.927 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
39.927 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
39.927 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
39.927 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
39.927 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in l
39.927 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in l
39.927 * [taylor]: Taking taylor expansion of (pow M 2) in l
39.927 * [taylor]: Taking taylor expansion of M in l
39.927 * [backup-simplify]: Simplify M into M
39.927 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in l
39.927 * [taylor]: Taking taylor expansion of (pow D 2) in l
39.927 * [taylor]: Taking taylor expansion of D in l
39.927 * [backup-simplify]: Simplify D into D
39.927 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in l
39.927 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.927 * [taylor]: Taking taylor expansion of (sqrt h) in l
39.927 * [taylor]: Taking taylor expansion of h in l
39.927 * [backup-simplify]: Simplify h into h
39.927 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
39.927 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
39.927 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in d
39.927 * [taylor]: Taking taylor expansion of 1/4 in d
39.927 * [backup-simplify]: Simplify 1/4 into 1/4
39.927 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in d
39.928 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in d
39.928 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in d
39.928 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in d
39.928 * [taylor]: Taking taylor expansion of 1/6 in d
39.928 * [backup-simplify]: Simplify 1/6 into 1/6
39.928 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in d
39.928 * [taylor]: Taking taylor expansion of (/ 1 l) in d
39.928 * [taylor]: Taking taylor expansion of l in d
39.928 * [backup-simplify]: Simplify l into l
39.928 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
39.928 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
39.928 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
39.928 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
39.928 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in d
39.928 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in d
39.928 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in d
39.928 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in d
39.928 * [taylor]: Taking taylor expansion of 1/3 in d
39.928 * [backup-simplify]: Simplify 1/3 into 1/3
39.928 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in d
39.928 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in d
39.928 * [taylor]: Taking taylor expansion of (pow d 4) in d
39.928 * [taylor]: Taking taylor expansion of d in d
39.928 * [backup-simplify]: Simplify 0 into 0
39.928 * [backup-simplify]: Simplify 1 into 1
39.928 * [backup-simplify]: Simplify (* 1 1) into 1
39.929 * [backup-simplify]: Simplify (* 1 1) into 1
39.929 * [backup-simplify]: Simplify (/ 1 1) into 1
39.929 * [backup-simplify]: Simplify (log 1) into 0
39.930 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
39.930 * [backup-simplify]: Simplify (* 1/3 (- (* 4 (log d)))) into (* -4/3 (log d))
39.930 * [backup-simplify]: Simplify (exp (* -4/3 (log d))) into (pow d -4/3)
39.930 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in d
39.930 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in d
39.930 * [taylor]: Taking taylor expansion of (pow M 2) in d
39.930 * [taylor]: Taking taylor expansion of M in d
39.930 * [backup-simplify]: Simplify M into M
39.930 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in d
39.930 * [taylor]: Taking taylor expansion of (pow D 2) in d
39.930 * [taylor]: Taking taylor expansion of D in d
39.930 * [backup-simplify]: Simplify D into D
39.930 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in d
39.930 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.930 * [taylor]: Taking taylor expansion of (sqrt h) in d
39.930 * [taylor]: Taking taylor expansion of h in d
39.930 * [backup-simplify]: Simplify h into h
39.930 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
39.930 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
39.930 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in d
39.930 * [taylor]: Taking taylor expansion of 1/4 in d
39.930 * [backup-simplify]: Simplify 1/4 into 1/4
39.930 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in d
39.930 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in d
39.930 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in d
39.930 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in d
39.930 * [taylor]: Taking taylor expansion of 1/6 in d
39.930 * [backup-simplify]: Simplify 1/6 into 1/6
39.930 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in d
39.930 * [taylor]: Taking taylor expansion of (/ 1 l) in d
39.930 * [taylor]: Taking taylor expansion of l in d
39.930 * [backup-simplify]: Simplify l into l
39.930 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
39.930 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
39.930 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
39.930 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
39.930 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in d
39.931 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in d
39.931 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in d
39.931 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in d
39.931 * [taylor]: Taking taylor expansion of 1/3 in d
39.931 * [backup-simplify]: Simplify 1/3 into 1/3
39.931 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in d
39.931 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in d
39.931 * [taylor]: Taking taylor expansion of (pow d 4) in d
39.931 * [taylor]: Taking taylor expansion of d in d
39.931 * [backup-simplify]: Simplify 0 into 0
39.931 * [backup-simplify]: Simplify 1 into 1
39.931 * [backup-simplify]: Simplify (* 1 1) into 1
39.931 * [backup-simplify]: Simplify (* 1 1) into 1
39.931 * [backup-simplify]: Simplify (/ 1 1) into 1
39.932 * [backup-simplify]: Simplify (log 1) into 0
39.932 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
39.932 * [backup-simplify]: Simplify (* 1/3 (- (* 4 (log d)))) into (* -4/3 (log d))
39.932 * [backup-simplify]: Simplify (exp (* -4/3 (log d))) into (pow d -4/3)
39.932 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in d
39.932 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in d
39.932 * [taylor]: Taking taylor expansion of (pow M 2) in d
39.932 * [taylor]: Taking taylor expansion of M in d
39.932 * [backup-simplify]: Simplify M into M
39.932 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in d
39.932 * [taylor]: Taking taylor expansion of (pow D 2) in d
39.932 * [taylor]: Taking taylor expansion of D in d
39.932 * [backup-simplify]: Simplify D into D
39.932 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in d
39.932 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.932 * [taylor]: Taking taylor expansion of (sqrt h) in d
39.932 * [taylor]: Taking taylor expansion of h in d
39.932 * [backup-simplify]: Simplify h into h
39.932 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
39.933 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
39.933 * [backup-simplify]: Simplify (* M M) into (pow M 2)
39.933 * [backup-simplify]: Simplify (* D D) into (pow D 2)
39.933 * [backup-simplify]: Simplify (* (pow D 2) (fabs (pow (/ d l) 1/3))) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
39.933 * [backup-simplify]: Simplify (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
39.933 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) into (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))
39.933 * [backup-simplify]: Simplify (* (pow d -4/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) into (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))
39.934 * [backup-simplify]: Simplify (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))) into (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))
39.934 * [backup-simplify]: Simplify (* 1/4 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (* 1/4 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))
39.934 * [taylor]: Taking taylor expansion of (* 1/4 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))))) in l
39.934 * [taylor]: Taking taylor expansion of 1/4 in l
39.934 * [backup-simplify]: Simplify 1/4 into 1/4
39.934 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))) in l
39.934 * [taylor]: Taking taylor expansion of (sqrt h) in l
39.934 * [taylor]: Taking taylor expansion of h in l
39.934 * [backup-simplify]: Simplify h into h
39.934 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
39.934 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
39.934 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))) in l
39.934 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in l
39.934 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in l
39.934 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in l
39.934 * [taylor]: Taking taylor expansion of 1/3 in l
39.934 * [backup-simplify]: Simplify 1/3 into 1/3
39.934 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in l
39.934 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in l
39.934 * [taylor]: Taking taylor expansion of (pow d 4) in l
39.934 * [taylor]: Taking taylor expansion of d in l
39.934 * [backup-simplify]: Simplify d into d
39.934 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.934 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.934 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
39.934 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
39.935 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
39.935 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
39.935 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)) in l
39.935 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in l
39.935 * [taylor]: Taking taylor expansion of (pow M 2) in l
39.935 * [taylor]: Taking taylor expansion of M in l
39.935 * [backup-simplify]: Simplify M into M
39.935 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in l
39.935 * [taylor]: Taking taylor expansion of (pow D 2) in l
39.935 * [taylor]: Taking taylor expansion of D in l
39.935 * [backup-simplify]: Simplify D into D
39.935 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in l
39.935 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.935 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in l
39.935 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in l
39.935 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in l
39.935 * [taylor]: Taking taylor expansion of 1/6 in l
39.935 * [backup-simplify]: Simplify 1/6 into 1/6
39.935 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in l
39.935 * [taylor]: Taking taylor expansion of (/ 1 l) in l
39.935 * [taylor]: Taking taylor expansion of l in l
39.935 * [backup-simplify]: Simplify 0 into 0
39.935 * [backup-simplify]: Simplify 1 into 1
39.935 * [backup-simplify]: Simplify (/ 1 1) into 1
39.936 * [backup-simplify]: Simplify (log 1) into 0
39.936 * [backup-simplify]: Simplify (+ (* (- 1) (log l)) 0) into (- (log l))
39.936 * [backup-simplify]: Simplify (* 1/6 (- (log l))) into (* -1/6 (log l))
39.936 * [backup-simplify]: Simplify (exp (* -1/6 (log l))) into (pow l -1/6)
39.936 * [backup-simplify]: Simplify (* M M) into (pow M 2)
39.936 * [backup-simplify]: Simplify (* D D) into (pow D 2)
39.936 * [backup-simplify]: Simplify (* (pow D 2) (fabs (pow (/ d l) 1/3))) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
39.936 * [backup-simplify]: Simplify (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
39.937 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow l -1/6)) into (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))
39.937 * [backup-simplify]: Simplify (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))) into (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))
39.937 * [backup-simplify]: Simplify (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))
39.937 * [backup-simplify]: Simplify (* 1/4 (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))) into (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))))
39.938 * [taylor]: Taking taylor expansion of (* 1/4 (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) in h
39.938 * [taylor]: Taking taylor expansion of 1/4 in h
39.938 * [backup-simplify]: Simplify 1/4 into 1/4
39.938 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) in h
39.938 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in h
39.938 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in h
39.938 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in h
39.938 * [taylor]: Taking taylor expansion of 1/6 in h
39.938 * [backup-simplify]: Simplify 1/6 into 1/6
39.938 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in h
39.938 * [taylor]: Taking taylor expansion of (/ 1 l) in h
39.938 * [taylor]: Taking taylor expansion of l in h
39.938 * [backup-simplify]: Simplify l into l
39.938 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
39.938 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
39.938 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
39.938 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
39.938 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))) in h
39.938 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in h
39.938 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in h
39.938 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in h
39.938 * [taylor]: Taking taylor expansion of 1/3 in h
39.938 * [backup-simplify]: Simplify 1/3 into 1/3
39.938 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in h
39.938 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in h
39.938 * [taylor]: Taking taylor expansion of (pow d 4) in h
39.938 * [taylor]: Taking taylor expansion of d in h
39.938 * [backup-simplify]: Simplify d into d
39.938 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.938 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.938 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
39.938 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
39.938 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
39.938 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
39.938 * [taylor]: Taking taylor expansion of (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)) in h
39.938 * [taylor]: Taking taylor expansion of (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) in h
39.939 * [taylor]: Taking taylor expansion of (pow M 2) in h
39.939 * [taylor]: Taking taylor expansion of M in h
39.939 * [backup-simplify]: Simplify M into M
39.939 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in h
39.939 * [taylor]: Taking taylor expansion of (pow D 2) in h
39.939 * [taylor]: Taking taylor expansion of D in h
39.939 * [backup-simplify]: Simplify D into D
39.939 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in h
39.939 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.939 * [taylor]: Taking taylor expansion of (sqrt h) in h
39.939 * [taylor]: Taking taylor expansion of h in h
39.939 * [backup-simplify]: Simplify 0 into 0
39.939 * [backup-simplify]: Simplify 1 into 1
39.939 * [backup-simplify]: Simplify (sqrt 0) into 0
39.940 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
39.940 * [backup-simplify]: Simplify (* M M) into (pow M 2)
39.940 * [backup-simplify]: Simplify (* D D) into (pow D 2)
39.940 * [backup-simplify]: Simplify (* (pow D 2) (fabs (pow (/ d l) 1/3))) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
39.940 * [backup-simplify]: Simplify (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
39.941 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) into 0
39.941 * [backup-simplify]: Simplify (* (pow (/ 1 (pow d 4)) 1/3) 0) into 0
39.941 * [backup-simplify]: Simplify (* (pow (/ 1 l) 1/6) 0) into 0
39.942 * [backup-simplify]: Simplify (* 1/4 0) into 0
39.942 * [taylor]: Taking taylor expansion of 0 in M
39.942 * [backup-simplify]: Simplify 0 into 0
39.942 * [taylor]: Taking taylor expansion of 0 in D
39.942 * [backup-simplify]: Simplify 0 into 0
39.942 * [backup-simplify]: Simplify 0 into 0
39.942 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
39.942 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (fabs (pow (/ d l) 1/3)))) into 0
39.942 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
39.942 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3))))) into 0
39.943 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (sqrt h))) into 0
39.943 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
39.944 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
39.944 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
39.945 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
39.945 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
39.946 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (- (* 4 (log d))))) into 0
39.946 * [backup-simplify]: Simplify (* (exp (* -4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
39.946 * [backup-simplify]: Simplify (+ (* (pow d -4/3) 0) (* 0 (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) into 0
39.946 * [backup-simplify]: Simplify (- (+ (* (/ 1 l) (/ 0 l)))) into 0
39.947 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 l) 1)))) 1) into 0
39.947 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (/ 1 l)))) into 0
39.948 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 l)))) (+ (* (/ (pow 0 1) 1)))) into 0
39.948 * [backup-simplify]: Simplify (+ (* (pow (/ 1 l) 1/6) 0) (* 0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))) into 0
39.949 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))) into 0
39.949 * [taylor]: Taking taylor expansion of 0 in l
39.949 * [backup-simplify]: Simplify 0 into 0
39.949 * [taylor]: Taking taylor expansion of 0 in h
39.949 * [backup-simplify]: Simplify 0 into 0
39.949 * [taylor]: Taking taylor expansion of 0 in M
39.949 * [backup-simplify]: Simplify 0 into 0
39.949 * [taylor]: Taking taylor expansion of 0 in D
39.949 * [backup-simplify]: Simplify 0 into 0
39.949 * [backup-simplify]: Simplify 0 into 0
39.949 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
39.950 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
39.950 * [backup-simplify]: Simplify (+ (* (- 1) (log l)) 0) into (- (log l))
39.951 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (- (log l)))) into 0
39.951 * [backup-simplify]: Simplify (* (exp (* -1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
39.951 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
39.951 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (fabs (pow (/ d l) 1/3)))) into 0
39.951 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
39.952 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3))))) into 0
39.952 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (pow l -1/6))) into 0
39.952 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
39.952 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
39.952 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))))) into 0
39.953 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 1) into 0
39.953 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (/ 1 (pow d 4))))) into 0
39.953 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 1) 1)))) into 0
39.954 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow d 4)) 1/3) 0) (* 0 (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))) into 0
39.954 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (* 0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into 0
39.955 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))))) into 0
39.955 * [taylor]: Taking taylor expansion of 0 in h
39.955 * [backup-simplify]: Simplify 0 into 0
39.955 * [taylor]: Taking taylor expansion of 0 in M
39.955 * [backup-simplify]: Simplify 0 into 0
39.955 * [taylor]: Taking taylor expansion of 0 in D
39.955 * [backup-simplify]: Simplify 0 into 0
39.955 * [backup-simplify]: Simplify 0 into 0
39.955 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
39.955 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (fabs (pow (/ d l) 1/3)))) into 0
39.955 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
39.956 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3))))) into 0
39.957 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) +nan.0) (* 0 0)) into (- (* +nan.0 (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))
39.957 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
39.957 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
39.957 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))))) into 0
39.957 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 1) into 0
39.958 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (/ 1 (pow d 4))))) into 0
39.958 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 1) 1)))) into 0
39.959 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow d 4)) 1/3) (- (* +nan.0 (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (* 0 0)) into (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow (/ 1 (pow d 4)) 1/3))))
39.959 * [backup-simplify]: Simplify (- (+ (* (/ 1 l) (/ 0 l)))) into 0
39.959 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 l) 1)))) 1) into 0
39.960 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (/ 1 l)))) into 0
39.960 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 l)))) (+ (* (/ (pow 0 1) 1)))) into 0
39.961 * [backup-simplify]: Simplify (+ (* (pow (/ 1 l) 1/6) (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow (/ 1 (pow d 4)) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))
39.962 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))) (* 0 0)) into (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
39.962 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in M
39.962 * [taylor]: Taking taylor expansion of (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in M
39.962 * [taylor]: Taking taylor expansion of +nan.0 in M
39.962 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.962 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in M
39.962 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in M
39.962 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in M
39.962 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.962 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
39.962 * [taylor]: Taking taylor expansion of (pow M 2) in M
39.962 * [taylor]: Taking taylor expansion of M in M
39.962 * [backup-simplify]: Simplify 0 into 0
39.962 * [backup-simplify]: Simplify 1 into 1
39.962 * [taylor]: Taking taylor expansion of (pow D 2) in M
39.962 * [taylor]: Taking taylor expansion of D in M
39.962 * [backup-simplify]: Simplify D into D
39.962 * [taylor]: Taking taylor expansion of (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in M
39.962 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in M
39.962 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in M
39.962 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in M
39.962 * [taylor]: Taking taylor expansion of 1/6 in M
39.962 * [backup-simplify]: Simplify 1/6 into 1/6
39.962 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in M
39.962 * [taylor]: Taking taylor expansion of (/ 1 l) in M
39.962 * [taylor]: Taking taylor expansion of l in M
39.962 * [backup-simplify]: Simplify l into l
39.962 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
39.962 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
39.962 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
39.963 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
39.963 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in M
39.963 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in M
39.963 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in M
39.963 * [taylor]: Taking taylor expansion of 1/3 in M
39.963 * [backup-simplify]: Simplify 1/3 into 1/3
39.963 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in M
39.963 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in M
39.963 * [taylor]: Taking taylor expansion of (pow d 4) in M
39.963 * [taylor]: Taking taylor expansion of d in M
39.963 * [backup-simplify]: Simplify d into d
39.963 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.963 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.963 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
39.963 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
39.963 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
39.963 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
39.963 * [backup-simplify]: Simplify (* 1 1) into 1
39.963 * [backup-simplify]: Simplify (* D D) into (pow D 2)
39.963 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
39.964 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (pow D 2)) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
39.964 * [backup-simplify]: Simplify (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)) into (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))
39.964 * [backup-simplify]: Simplify (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)))
39.964 * [backup-simplify]: Simplify (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)))) into (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6))))
39.964 * [backup-simplify]: Simplify (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6))))) into (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)))))
39.965 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6))))) in D
39.965 * [taylor]: Taking taylor expansion of (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)))) in D
39.965 * [taylor]: Taking taylor expansion of +nan.0 in D
39.965 * [backup-simplify]: Simplify +nan.0 into +nan.0
39.965 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6))) in D
39.965 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in D
39.965 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in D
39.965 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in D
39.965 * [taylor]: Taking taylor expansion of 1/3 in D
39.965 * [backup-simplify]: Simplify 1/3 into 1/3
39.965 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in D
39.965 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in D
39.965 * [taylor]: Taking taylor expansion of (pow d 4) in D
39.965 * [taylor]: Taking taylor expansion of d in D
39.965 * [backup-simplify]: Simplify d into d
39.965 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.965 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.965 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
39.965 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
39.965 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
39.965 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
39.965 * [taylor]: Taking taylor expansion of (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 l) 1/6)) in D
39.965 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in D
39.965 * [taylor]: Taking taylor expansion of (pow D 2) in D
39.965 * [taylor]: Taking taylor expansion of D in D
39.965 * [backup-simplify]: Simplify 0 into 0
39.965 * [backup-simplify]: Simplify 1 into 1
39.965 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in D
39.965 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
39.965 * [taylor]: Taking taylor expansion of (pow (/ 1 l) 1/6) in D
39.965 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 l)))) in D
39.965 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 l))) in D
39.965 * [taylor]: Taking taylor expansion of 1/6 in D
39.965 * [backup-simplify]: Simplify 1/6 into 1/6
39.965 * [taylor]: Taking taylor expansion of (log (/ 1 l)) in D
39.965 * [taylor]: Taking taylor expansion of (/ 1 l) in D
39.965 * [taylor]: Taking taylor expansion of l in D
39.965 * [backup-simplify]: Simplify l into l
39.965 * [backup-simplify]: Simplify (/ 1 l) into (/ 1 l)
39.965 * [backup-simplify]: Simplify (log (/ 1 l)) into (log (/ 1 l))
39.966 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 l))) into (* 1/6 (log (/ 1 l)))
39.966 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 l)))) into (pow (/ 1 l) 1/6)
39.966 * [backup-simplify]: Simplify (* 1 1) into 1
39.966 * [backup-simplify]: Simplify (* 1 (fabs (pow (/ d l) 1/3))) into (fabs (pow (/ d l) 1/3))
39.966 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (pow (/ 1 l) 1/6)) into (* (pow (/ 1 l) 1/6) (fabs (pow (/ d l) 1/3)))
39.966 * [backup-simplify]: Simplify (* (pow (/ 1 (pow d 4)) 1/3) (* (pow (/ 1 l) 1/6) (fabs (pow (/ d l) 1/3)))) into (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))
39.966 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))
39.967 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
39.967 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
39.967 * [taylor]: Taking taylor expansion of 0 in D
39.967 * [backup-simplify]: Simplify 0 into 0
39.967 * [backup-simplify]: Simplify 0 into 0
39.967 * [backup-simplify]: Simplify 0 into 0
39.968 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt h))) into 0
39.968 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
39.968 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (fabs (pow (/ d l) 1/3))))) into 0
39.969 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
39.969 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3)))))) into 0
39.969 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (+ (* 0 0) (* 0 (sqrt h)))) into 0
39.970 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
39.971 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
39.971 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.973 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
39.973 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
39.973 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (- (* 4 (log d)))))) into 0
39.974 * [backup-simplify]: Simplify (* (exp (* -4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
39.975 * [backup-simplify]: Simplify (+ (* (pow d -4/3) 0) (+ (* 0 0) (* 0 (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) into 0
39.975 * [backup-simplify]: Simplify (- (+ (* (/ 1 l) (/ 0 l)) (* 0 (/ 0 l)))) into 0
39.976 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (/ 1 l) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (/ 1 l) 1)))) 2) into 0
39.976 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (/ 1 l))))) into 0
39.977 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 l)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
39.978 * [backup-simplify]: Simplify (+ (* (pow (/ 1 l) 1/6) 0) (+ (* 0 0) (* 0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))))) into 0
39.979 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))))) into 0
39.979 * [taylor]: Taking taylor expansion of 0 in l
39.979 * [backup-simplify]: Simplify 0 into 0
39.979 * [taylor]: Taking taylor expansion of 0 in h
39.979 * [backup-simplify]: Simplify 0 into 0
39.979 * [taylor]: Taking taylor expansion of 0 in M
39.979 * [backup-simplify]: Simplify 0 into 0
39.979 * [taylor]: Taking taylor expansion of 0 in D
39.979 * [backup-simplify]: Simplify 0 into 0
39.979 * [backup-simplify]: Simplify 0 into 0
39.979 * [taylor]: Taking taylor expansion of 0 in h
39.979 * [backup-simplify]: Simplify 0 into 0
39.979 * [taylor]: Taking taylor expansion of 0 in M
39.979 * [backup-simplify]: Simplify 0 into 0
39.979 * [taylor]: Taking taylor expansion of 0 in D
39.979 * [backup-simplify]: Simplify 0 into 0
39.979 * [backup-simplify]: Simplify 0 into 0
39.980 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
39.981 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
39.981 * [backup-simplify]: Simplify (+ (* (- 1) (log l)) 0) into (- (log l))
39.982 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (- (log l))))) into 0
39.983 * [backup-simplify]: Simplify (* (exp (* -1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
39.983 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
39.983 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (fabs (pow (/ d l) 1/3))))) into 0
39.984 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
39.984 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (* (pow D 2) (fabs (pow (/ d l) 1/3)))))) into 0
39.984 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (+ (* 0 0) (* 0 (pow l -1/6)))) into 0
39.985 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
39.985 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
39.985 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))) (* 0 (/ 0 (pow d 4))))) into 0
39.986 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (/ 1 (pow d 4)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 2) into 0
39.987 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (/ 1 (pow d 4)))))) into 0
39.988 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
39.988 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow d 4)) 1/3) 0) (+ (* 0 0) (* 0 (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))))) into 0
39.989 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt h))) into 0
39.989 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (+ (* 0 0) (* 0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))) into 0
39.990 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (pow (/ 1 l) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))))) into 0
39.990 * [taylor]: Taking taylor expansion of 0 in h
39.990 * [backup-simplify]: Simplify 0 into 0
39.990 * [taylor]: Taking taylor expansion of 0 in M
39.990 * [backup-simplify]: Simplify 0 into 0
39.990 * [taylor]: Taking taylor expansion of 0 in D
39.990 * [backup-simplify]: Simplify 0 into 0
39.990 * [backup-simplify]: Simplify 0 into 0
39.990 * [taylor]: Taking taylor expansion of 0 in M
39.990 * [backup-simplify]: Simplify 0 into 0
39.990 * [taylor]: Taking taylor expansion of 0 in D
39.990 * [backup-simplify]: Simplify 0 into 0
39.990 * [backup-simplify]: Simplify 0 into 0
39.991 * [backup-simplify]: Simplify (* (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) (* (pow D 2) (* (pow M 2) (* h (* 1 1))))) into (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 l) 1/6))))
39.991 * [backup-simplify]: Simplify (* (* (* (fabs (/ (cbrt (/ 1 d)) (cbrt (/ 1 l)))) (sqrt (/ (cbrt (/ 1 d)) (cbrt (/ 1 l))))) (sqrt (/ (/ 1 d) (/ 1 h)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (/ 1 h)))) into (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
39.991 * [approximate]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in (d l h M D) around 0
39.991 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in D
39.991 * [taylor]: Taking taylor expansion of 1/4 in D
39.991 * [backup-simplify]: Simplify 1/4 into 1/4
39.991 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in D
39.991 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in D
39.992 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
39.992 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
39.992 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in D
39.992 * [taylor]: Taking taylor expansion of (pow D 2) in D
39.992 * [taylor]: Taking taylor expansion of D in D
39.992 * [backup-simplify]: Simplify 0 into 0
39.992 * [backup-simplify]: Simplify 1 into 1
39.992 * [taylor]: Taking taylor expansion of (pow M 2) in D
39.992 * [taylor]: Taking taylor expansion of M in D
39.992 * [backup-simplify]: Simplify M into M
39.992 * [backup-simplify]: Simplify (* 1 1) into 1
39.992 * [backup-simplify]: Simplify (* M M) into (pow M 2)
39.992 * [backup-simplify]: Simplify (* 1 (pow M 2)) into (pow M 2)
39.992 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow M 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow M 2))
39.992 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in D
39.992 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
39.992 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
39.992 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
39.992 * [taylor]: Taking taylor expansion of 1/6 in D
39.992 * [backup-simplify]: Simplify 1/6 into 1/6
39.992 * [taylor]: Taking taylor expansion of (log l) in D
39.992 * [taylor]: Taking taylor expansion of l in D
39.992 * [backup-simplify]: Simplify l into l
39.992 * [backup-simplify]: Simplify (log l) into (log l)
39.992 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
39.992 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
39.992 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in D
39.993 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in D
39.993 * [taylor]: Taking taylor expansion of (/ 1 h) in D
39.993 * [taylor]: Taking taylor expansion of h in D
39.993 * [backup-simplify]: Simplify h into h
39.993 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
39.993 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
39.993 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
39.993 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
39.993 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
39.993 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
39.993 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
39.993 * [taylor]: Taking taylor expansion of 1/3 in D
39.993 * [backup-simplify]: Simplify 1/3 into 1/3
39.993 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
39.993 * [taylor]: Taking taylor expansion of (pow d 4) in D
39.993 * [taylor]: Taking taylor expansion of d in D
39.993 * [backup-simplify]: Simplify d into d
39.993 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.993 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.993 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
39.993 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
39.993 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
39.993 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in M
39.993 * [taylor]: Taking taylor expansion of 1/4 in M
39.993 * [backup-simplify]: Simplify 1/4 into 1/4
39.993 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in M
39.993 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
39.993 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
39.993 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
39.993 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
39.993 * [taylor]: Taking taylor expansion of (pow D 2) in M
39.993 * [taylor]: Taking taylor expansion of D in M
39.993 * [backup-simplify]: Simplify D into D
39.993 * [taylor]: Taking taylor expansion of (pow M 2) in M
39.993 * [taylor]: Taking taylor expansion of M in M
39.993 * [backup-simplify]: Simplify 0 into 0
39.993 * [backup-simplify]: Simplify 1 into 1
39.993 * [backup-simplify]: Simplify (* D D) into (pow D 2)
39.994 * [backup-simplify]: Simplify (* 1 1) into 1
39.994 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
39.994 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
39.994 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in M
39.994 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
39.994 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
39.994 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
39.994 * [taylor]: Taking taylor expansion of 1/6 in M
39.994 * [backup-simplify]: Simplify 1/6 into 1/6
39.994 * [taylor]: Taking taylor expansion of (log l) in M
39.994 * [taylor]: Taking taylor expansion of l in M
39.994 * [backup-simplify]: Simplify l into l
39.994 * [backup-simplify]: Simplify (log l) into (log l)
39.994 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
39.994 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
39.994 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in M
39.994 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in M
39.994 * [taylor]: Taking taylor expansion of (/ 1 h) in M
39.994 * [taylor]: Taking taylor expansion of h in M
39.994 * [backup-simplify]: Simplify h into h
39.994 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
39.994 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
39.994 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
39.994 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
39.994 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
39.994 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
39.995 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
39.995 * [taylor]: Taking taylor expansion of 1/3 in M
39.995 * [backup-simplify]: Simplify 1/3 into 1/3
39.995 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
39.995 * [taylor]: Taking taylor expansion of (pow d 4) in M
39.995 * [taylor]: Taking taylor expansion of d in M
39.995 * [backup-simplify]: Simplify d into d
39.995 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.995 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.995 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
39.995 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
39.995 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
39.995 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in h
39.995 * [taylor]: Taking taylor expansion of 1/4 in h
39.995 * [backup-simplify]: Simplify 1/4 into 1/4
39.995 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in h
39.995 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
39.995 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
39.995 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
39.995 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
39.995 * [taylor]: Taking taylor expansion of (pow D 2) in h
39.995 * [taylor]: Taking taylor expansion of D in h
39.995 * [backup-simplify]: Simplify D into D
39.995 * [taylor]: Taking taylor expansion of (pow M 2) in h
39.995 * [taylor]: Taking taylor expansion of M in h
39.995 * [backup-simplify]: Simplify M into M
39.995 * [backup-simplify]: Simplify (* D D) into (pow D 2)
39.995 * [backup-simplify]: Simplify (* M M) into (pow M 2)
39.995 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
39.995 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
39.995 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in h
39.995 * [taylor]: Taking taylor expansion of (pow l 1/6) in h
39.995 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in h
39.995 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in h
39.995 * [taylor]: Taking taylor expansion of 1/6 in h
39.996 * [backup-simplify]: Simplify 1/6 into 1/6
39.996 * [taylor]: Taking taylor expansion of (log l) in h
39.996 * [taylor]: Taking taylor expansion of l in h
39.996 * [backup-simplify]: Simplify l into l
39.996 * [backup-simplify]: Simplify (log l) into (log l)
39.996 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
39.996 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
39.996 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in h
39.996 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
39.996 * [taylor]: Taking taylor expansion of (/ 1 h) in h
39.996 * [taylor]: Taking taylor expansion of h in h
39.996 * [backup-simplify]: Simplify 0 into 0
39.996 * [backup-simplify]: Simplify 1 into 1
39.996 * [backup-simplify]: Simplify (/ 1 1) into 1
39.996 * [backup-simplify]: Simplify (sqrt 0) into 0
39.997 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
39.997 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
39.997 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
39.997 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
39.997 * [taylor]: Taking taylor expansion of 1/3 in h
39.997 * [backup-simplify]: Simplify 1/3 into 1/3
39.998 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
39.998 * [taylor]: Taking taylor expansion of (pow d 4) in h
39.998 * [taylor]: Taking taylor expansion of d in h
39.998 * [backup-simplify]: Simplify d into d
39.998 * [backup-simplify]: Simplify (* d d) into (pow d 2)
39.998 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
39.998 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
39.998 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
39.998 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
39.998 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in l
39.998 * [taylor]: Taking taylor expansion of 1/4 in l
39.998 * [backup-simplify]: Simplify 1/4 into 1/4
39.998 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in l
39.998 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
39.998 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
39.998 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
39.998 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
39.998 * [taylor]: Taking taylor expansion of (pow D 2) in l
39.998 * [taylor]: Taking taylor expansion of D in l
39.998 * [backup-simplify]: Simplify D into D
39.998 * [taylor]: Taking taylor expansion of (pow M 2) in l
39.998 * [taylor]: Taking taylor expansion of M in l
39.998 * [backup-simplify]: Simplify M into M
39.998 * [backup-simplify]: Simplify (* D D) into (pow D 2)
39.998 * [backup-simplify]: Simplify (* M M) into (pow M 2)
39.999 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
39.999 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
39.999 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in l
39.999 * [taylor]: Taking taylor expansion of (pow l 1/6) in l
39.999 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in l
39.999 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in l
39.999 * [taylor]: Taking taylor expansion of 1/6 in l
39.999 * [backup-simplify]: Simplify 1/6 into 1/6
39.999 * [taylor]: Taking taylor expansion of (log l) in l
39.999 * [taylor]: Taking taylor expansion of l in l
39.999 * [backup-simplify]: Simplify 0 into 0
39.999 * [backup-simplify]: Simplify 1 into 1
39.999 * [backup-simplify]: Simplify (log 1) into 0
39.999 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
39.999 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.000 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.000 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in l
40.000 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
40.000 * [taylor]: Taking taylor expansion of (/ 1 h) in l
40.000 * [taylor]: Taking taylor expansion of h in l
40.000 * [backup-simplify]: Simplify h into h
40.000 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.000 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.000 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.000 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.000 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
40.000 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
40.000 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
40.000 * [taylor]: Taking taylor expansion of 1/3 in l
40.000 * [backup-simplify]: Simplify 1/3 into 1/3
40.000 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
40.000 * [taylor]: Taking taylor expansion of (pow d 4) in l
40.000 * [taylor]: Taking taylor expansion of d in l
40.000 * [backup-simplify]: Simplify d into d
40.000 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.000 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.000 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.000 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.000 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.000 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in d
40.000 * [taylor]: Taking taylor expansion of 1/4 in d
40.000 * [backup-simplify]: Simplify 1/4 into 1/4
40.000 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in d
40.000 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
40.000 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
40.000 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.000 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
40.000 * [taylor]: Taking taylor expansion of (pow D 2) in d
40.000 * [taylor]: Taking taylor expansion of D in d
40.000 * [backup-simplify]: Simplify D into D
40.000 * [taylor]: Taking taylor expansion of (pow M 2) in d
40.000 * [taylor]: Taking taylor expansion of M in d
40.000 * [backup-simplify]: Simplify M into M
40.001 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.001 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.001 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.001 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.001 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in d
40.001 * [taylor]: Taking taylor expansion of (pow l 1/6) in d
40.001 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in d
40.001 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in d
40.001 * [taylor]: Taking taylor expansion of 1/6 in d
40.001 * [backup-simplify]: Simplify 1/6 into 1/6
40.001 * [taylor]: Taking taylor expansion of (log l) in d
40.001 * [taylor]: Taking taylor expansion of l in d
40.001 * [backup-simplify]: Simplify l into l
40.001 * [backup-simplify]: Simplify (log l) into (log l)
40.001 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.001 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.001 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in d
40.001 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
40.001 * [taylor]: Taking taylor expansion of (/ 1 h) in d
40.001 * [taylor]: Taking taylor expansion of h in d
40.001 * [backup-simplify]: Simplify h into h
40.001 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.001 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.001 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.001 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.001 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
40.001 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
40.001 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
40.001 * [taylor]: Taking taylor expansion of 1/3 in d
40.001 * [backup-simplify]: Simplify 1/3 into 1/3
40.001 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
40.001 * [taylor]: Taking taylor expansion of (pow d 4) in d
40.001 * [taylor]: Taking taylor expansion of d in d
40.001 * [backup-simplify]: Simplify 0 into 0
40.001 * [backup-simplify]: Simplify 1 into 1
40.002 * [backup-simplify]: Simplify (* 1 1) into 1
40.002 * [backup-simplify]: Simplify (* 1 1) into 1
40.002 * [backup-simplify]: Simplify (log 1) into 0
40.002 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.003 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
40.003 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
40.003 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in d
40.003 * [taylor]: Taking taylor expansion of 1/4 in d
40.003 * [backup-simplify]: Simplify 1/4 into 1/4
40.003 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in d
40.003 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
40.003 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
40.003 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.003 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
40.003 * [taylor]: Taking taylor expansion of (pow D 2) in d
40.003 * [taylor]: Taking taylor expansion of D in d
40.003 * [backup-simplify]: Simplify D into D
40.003 * [taylor]: Taking taylor expansion of (pow M 2) in d
40.003 * [taylor]: Taking taylor expansion of M in d
40.003 * [backup-simplify]: Simplify M into M
40.003 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.003 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.003 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.003 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.003 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in d
40.003 * [taylor]: Taking taylor expansion of (pow l 1/6) in d
40.003 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in d
40.003 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in d
40.003 * [taylor]: Taking taylor expansion of 1/6 in d
40.003 * [backup-simplify]: Simplify 1/6 into 1/6
40.003 * [taylor]: Taking taylor expansion of (log l) in d
40.003 * [taylor]: Taking taylor expansion of l in d
40.003 * [backup-simplify]: Simplify l into l
40.003 * [backup-simplify]: Simplify (log l) into (log l)
40.003 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.003 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.003 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in d
40.003 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
40.003 * [taylor]: Taking taylor expansion of (/ 1 h) in d
40.003 * [taylor]: Taking taylor expansion of h in d
40.004 * [backup-simplify]: Simplify h into h
40.004 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.004 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.004 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.004 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.004 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
40.004 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
40.004 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
40.004 * [taylor]: Taking taylor expansion of 1/3 in d
40.004 * [backup-simplify]: Simplify 1/3 into 1/3
40.004 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
40.004 * [taylor]: Taking taylor expansion of (pow d 4) in d
40.004 * [taylor]: Taking taylor expansion of d in d
40.004 * [backup-simplify]: Simplify 0 into 0
40.004 * [backup-simplify]: Simplify 1 into 1
40.004 * [backup-simplify]: Simplify (* 1 1) into 1
40.004 * [backup-simplify]: Simplify (* 1 1) into 1
40.005 * [backup-simplify]: Simplify (log 1) into 0
40.005 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.005 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
40.005 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
40.005 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (pow d 4/3)) into (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))
40.005 * [backup-simplify]: Simplify (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) into (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.006 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.006 * [backup-simplify]: Simplify (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
40.006 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in l
40.006 * [taylor]: Taking taylor expansion of 1/4 in l
40.006 * [backup-simplify]: Simplify 1/4 into 1/4
40.006 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in l
40.006 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
40.006 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
40.006 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.006 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
40.006 * [taylor]: Taking taylor expansion of (pow D 2) in l
40.006 * [taylor]: Taking taylor expansion of D in l
40.006 * [backup-simplify]: Simplify D into D
40.006 * [taylor]: Taking taylor expansion of (pow M 2) in l
40.006 * [taylor]: Taking taylor expansion of M in l
40.006 * [backup-simplify]: Simplify M into M
40.006 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.006 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.006 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.007 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.007 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in l
40.007 * [taylor]: Taking taylor expansion of (pow l 1/6) in l
40.007 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in l
40.007 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in l
40.007 * [taylor]: Taking taylor expansion of 1/6 in l
40.007 * [backup-simplify]: Simplify 1/6 into 1/6
40.007 * [taylor]: Taking taylor expansion of (log l) in l
40.007 * [taylor]: Taking taylor expansion of l in l
40.007 * [backup-simplify]: Simplify 0 into 0
40.007 * [backup-simplify]: Simplify 1 into 1
40.007 * [backup-simplify]: Simplify (log 1) into 0
40.007 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.007 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.007 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.007 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in l
40.008 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
40.008 * [taylor]: Taking taylor expansion of (/ 1 h) in l
40.008 * [taylor]: Taking taylor expansion of h in l
40.008 * [backup-simplify]: Simplify h into h
40.008 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.008 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.008 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.008 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.008 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
40.008 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
40.008 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
40.008 * [taylor]: Taking taylor expansion of 1/3 in l
40.008 * [backup-simplify]: Simplify 1/3 into 1/3
40.008 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
40.008 * [taylor]: Taking taylor expansion of (pow d 4) in l
40.008 * [taylor]: Taking taylor expansion of d in l
40.008 * [backup-simplify]: Simplify d into d
40.008 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.008 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.008 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.008 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.008 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.008 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) into (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))
40.008 * [backup-simplify]: Simplify (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) into (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.009 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.009 * [backup-simplify]: Simplify (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
40.009 * [taylor]: Taking taylor expansion of (* 1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in h
40.009 * [taylor]: Taking taylor expansion of 1/4 in h
40.009 * [backup-simplify]: Simplify 1/4 into 1/4
40.009 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in h
40.009 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
40.009 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
40.009 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.009 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
40.009 * [taylor]: Taking taylor expansion of (pow D 2) in h
40.009 * [taylor]: Taking taylor expansion of D in h
40.009 * [backup-simplify]: Simplify D into D
40.009 * [taylor]: Taking taylor expansion of (pow M 2) in h
40.009 * [taylor]: Taking taylor expansion of M in h
40.009 * [backup-simplify]: Simplify M into M
40.009 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.009 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.009 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.009 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.010 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in h
40.010 * [taylor]: Taking taylor expansion of (pow l 1/6) in h
40.010 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in h
40.010 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in h
40.010 * [taylor]: Taking taylor expansion of 1/6 in h
40.010 * [backup-simplify]: Simplify 1/6 into 1/6
40.010 * [taylor]: Taking taylor expansion of (log l) in h
40.010 * [taylor]: Taking taylor expansion of l in h
40.010 * [backup-simplify]: Simplify l into l
40.010 * [backup-simplify]: Simplify (log l) into (log l)
40.010 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.010 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.010 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in h
40.010 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
40.010 * [taylor]: Taking taylor expansion of (/ 1 h) in h
40.010 * [taylor]: Taking taylor expansion of h in h
40.010 * [backup-simplify]: Simplify 0 into 0
40.010 * [backup-simplify]: Simplify 1 into 1
40.010 * [backup-simplify]: Simplify (/ 1 1) into 1
40.010 * [backup-simplify]: Simplify (sqrt 0) into 0
40.011 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
40.011 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
40.011 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
40.011 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
40.011 * [taylor]: Taking taylor expansion of 1/3 in h
40.011 * [backup-simplify]: Simplify 1/3 into 1/3
40.011 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
40.011 * [taylor]: Taking taylor expansion of (pow d 4) in h
40.011 * [taylor]: Taking taylor expansion of d in h
40.011 * [backup-simplify]: Simplify d into d
40.011 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.012 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.012 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.012 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.012 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.012 * [backup-simplify]: Simplify (* 0 (pow (pow d 4) 1/3)) into 0
40.012 * [backup-simplify]: Simplify (* (pow l 1/6) 0) into 0
40.012 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) into 0
40.012 * [backup-simplify]: Simplify (* 1/4 0) into 0
40.012 * [taylor]: Taking taylor expansion of 0 in M
40.012 * [backup-simplify]: Simplify 0 into 0
40.013 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.013 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.014 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
40.014 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.014 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (* 4 (log d)))) into 0
40.015 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
40.015 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (pow d 4/3))) into 0
40.016 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
40.016 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.020 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.020 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into 0
40.021 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.021 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.021 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.021 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.021 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
40.022 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
40.022 * [taylor]: Taking taylor expansion of 0 in l
40.022 * [backup-simplify]: Simplify 0 into 0
40.022 * [taylor]: Taking taylor expansion of 0 in h
40.022 * [backup-simplify]: Simplify 0 into 0
40.022 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.022 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.023 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.023 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.024 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.024 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (pow (pow d 4) 1/3))) into 0
40.024 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
40.025 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.025 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.026 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.026 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into 0
40.026 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.026 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.026 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.026 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.026 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
40.027 * [backup-simplify]: Simplify (+ (* 1/4 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
40.027 * [taylor]: Taking taylor expansion of 0 in h
40.027 * [backup-simplify]: Simplify 0 into 0
40.027 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.027 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.028 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.028 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.029 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.029 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (pow (pow d 4) 1/3))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
40.029 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
40.030 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.030 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.031 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0)) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.031 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.031 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.031 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.031 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.032 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.033 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.033 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
40.033 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
40.033 * [taylor]: Taking taylor expansion of +nan.0 in M
40.033 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.033 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
40.033 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.033 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.033 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.033 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.033 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.034 * [taylor]: Taking taylor expansion of D in M
40.034 * [backup-simplify]: Simplify D into D
40.034 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.034 * [taylor]: Taking taylor expansion of M in M
40.034 * [backup-simplify]: Simplify 0 into 0
40.034 * [backup-simplify]: Simplify 1 into 1
40.034 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.034 * [backup-simplify]: Simplify (* 1 1) into 1
40.034 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.034 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.034 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
40.034 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
40.035 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
40.035 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
40.035 * [taylor]: Taking taylor expansion of 1/6 in M
40.035 * [backup-simplify]: Simplify 1/6 into 1/6
40.035 * [taylor]: Taking taylor expansion of (log l) in M
40.035 * [taylor]: Taking taylor expansion of l in M
40.035 * [backup-simplify]: Simplify l into l
40.035 * [backup-simplify]: Simplify (log l) into (log l)
40.035 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.035 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.035 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.035 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.035 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.035 * [taylor]: Taking taylor expansion of 1/3 in M
40.035 * [backup-simplify]: Simplify 1/3 into 1/3
40.035 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.035 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.035 * [taylor]: Taking taylor expansion of d in M
40.035 * [backup-simplify]: Simplify d into d
40.035 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.035 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.035 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.035 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.036 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.036 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.036 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.036 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.037 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.037 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
40.037 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
40.037 * [taylor]: Taking taylor expansion of +nan.0 in D
40.037 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.037 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
40.037 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
40.037 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.037 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.037 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.037 * [taylor]: Taking taylor expansion of D in D
40.037 * [backup-simplify]: Simplify 0 into 0
40.037 * [backup-simplify]: Simplify 1 into 1
40.038 * [backup-simplify]: Simplify (* 1 1) into 1
40.038 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
40.038 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
40.038 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
40.038 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
40.038 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
40.038 * [taylor]: Taking taylor expansion of 1/6 in D
40.038 * [backup-simplify]: Simplify 1/6 into 1/6
40.038 * [taylor]: Taking taylor expansion of (log l) in D
40.038 * [taylor]: Taking taylor expansion of l in D
40.038 * [backup-simplify]: Simplify l into l
40.038 * [backup-simplify]: Simplify (log l) into (log l)
40.038 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.039 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.039 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.039 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.039 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.039 * [taylor]: Taking taylor expansion of 1/3 in D
40.039 * [backup-simplify]: Simplify 1/3 into 1/3
40.039 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.039 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.039 * [taylor]: Taking taylor expansion of d in D
40.039 * [backup-simplify]: Simplify d into d
40.039 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.039 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.039 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.039 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.039 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.039 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.040 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.040 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.040 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.041 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.042 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.043 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.046 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
40.046 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.047 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (* 4 (log d))))) into 0
40.048 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.049 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.049 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
40.050 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (pow d 4/3)))) into 0
40.051 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow l 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow l 1)))) 2) into 0
40.052 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
40.054 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.054 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
40.055 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.055 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.056 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
40.056 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.058 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
40.059 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
40.059 * [taylor]: Taking taylor expansion of 0 in l
40.059 * [backup-simplify]: Simplify 0 into 0
40.059 * [taylor]: Taking taylor expansion of 0 in h
40.059 * [backup-simplify]: Simplify 0 into 0
40.059 * [taylor]: Taking taylor expansion of 0 in h
40.059 * [backup-simplify]: Simplify 0 into 0
40.060 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
40.061 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
40.062 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
40.063 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
40.065 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.065 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.066 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
40.067 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
40.070 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
40.071 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.072 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
40.073 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.074 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
40.074 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.075 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.076 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
40.077 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.078 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
40.079 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
40.080 * [taylor]: Taking taylor expansion of 0 in h
40.080 * [backup-simplify]: Simplify 0 into 0
40.080 * [taylor]: Taking taylor expansion of 0 in M
40.080 * [backup-simplify]: Simplify 0 into 0
40.080 * [taylor]: Taking taylor expansion of 0 in M
40.080 * [backup-simplify]: Simplify 0 into 0
40.080 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
40.081 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
40.083 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
40.083 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
40.085 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.086 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
40.089 * [backup-simplify]: Simplify (/ (- 0 (pow +nan.0 2) (+)) (* 2 0)) into +nan.0
40.090 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (* +nan.0 (pow (pow d 4) 1/3)))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
40.092 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow l 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow l 1)))) 2) into 0
40.092 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
40.094 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.095 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0))) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.095 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.096 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.096 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
40.097 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.098 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.100 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.100 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
40.100 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
40.100 * [taylor]: Taking taylor expansion of +nan.0 in M
40.100 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.100 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
40.100 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.100 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.100 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.100 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.100 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.100 * [taylor]: Taking taylor expansion of D in M
40.100 * [backup-simplify]: Simplify D into D
40.100 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.101 * [taylor]: Taking taylor expansion of M in M
40.101 * [backup-simplify]: Simplify 0 into 0
40.101 * [backup-simplify]: Simplify 1 into 1
40.101 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.101 * [backup-simplify]: Simplify (* 1 1) into 1
40.101 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.101 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.101 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
40.101 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
40.101 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
40.101 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
40.101 * [taylor]: Taking taylor expansion of 1/6 in M
40.101 * [backup-simplify]: Simplify 1/6 into 1/6
40.101 * [taylor]: Taking taylor expansion of (log l) in M
40.102 * [taylor]: Taking taylor expansion of l in M
40.102 * [backup-simplify]: Simplify l into l
40.102 * [backup-simplify]: Simplify (log l) into (log l)
40.102 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.102 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.102 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.102 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.102 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.102 * [taylor]: Taking taylor expansion of 1/3 in M
40.102 * [backup-simplify]: Simplify 1/3 into 1/3
40.102 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.102 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.102 * [taylor]: Taking taylor expansion of d in M
40.102 * [backup-simplify]: Simplify d into d
40.102 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.102 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.102 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.102 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.102 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.103 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.103 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.103 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.104 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.104 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
40.104 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
40.104 * [taylor]: Taking taylor expansion of +nan.0 in D
40.104 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.104 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
40.104 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
40.104 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.104 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.104 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.104 * [taylor]: Taking taylor expansion of D in D
40.104 * [backup-simplify]: Simplify 0 into 0
40.104 * [backup-simplify]: Simplify 1 into 1
40.105 * [backup-simplify]: Simplify (* 1 1) into 1
40.105 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
40.105 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
40.105 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
40.105 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
40.105 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
40.105 * [taylor]: Taking taylor expansion of 1/6 in D
40.105 * [backup-simplify]: Simplify 1/6 into 1/6
40.105 * [taylor]: Taking taylor expansion of (log l) in D
40.105 * [taylor]: Taking taylor expansion of l in D
40.105 * [backup-simplify]: Simplify l into l
40.105 * [backup-simplify]: Simplify (log l) into (log l)
40.105 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.105 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.105 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.105 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.105 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.105 * [taylor]: Taking taylor expansion of 1/3 in D
40.105 * [backup-simplify]: Simplify 1/3 into 1/3
40.106 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.106 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.106 * [taylor]: Taking taylor expansion of d in D
40.106 * [backup-simplify]: Simplify d into d
40.106 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.106 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.106 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.106 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.106 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.106 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.106 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.107 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.107 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.108 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.108 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.108 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.109 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.110 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.111 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.111 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
40.112 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.113 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.113 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
40.113 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.114 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.114 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
40.114 * [backup-simplify]: Simplify (- (/ 0 (pow D 2)) (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (/ 0 (pow D 2))))) into 0
40.115 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) 0) (* 0 (* (pow l 1/6) (pow (pow d 4) 1/3)))) into 0
40.116 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
40.116 * [backup-simplify]: Simplify (- 0) into 0
40.116 * [taylor]: Taking taylor expansion of 0 in D
40.116 * [backup-simplify]: Simplify 0 into 0
40.116 * [taylor]: Taking taylor expansion of 0 in D
40.116 * [backup-simplify]: Simplify 0 into 0
40.116 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.116 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.117 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.118 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.118 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.119 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
40.120 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.121 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.121 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
40.121 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.122 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (fabs (pow (/ l d) 1/3)) (/ 0 1)))) into 0
40.123 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ l d) 1/3)) 0) (* 0 (* (pow l 1/6) (pow (pow d 4) 1/3)))) into 0
40.123 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
40.124 * [backup-simplify]: Simplify (- 0) into 0
40.124 * [backup-simplify]: Simplify 0 into 0
40.125 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
40.126 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
40.132 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
40.133 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.134 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 4 (log d)))))) into 0
40.136 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.136 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.137 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
40.138 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4/3))))) into 0
40.140 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow l 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow l 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow l 1)))) 6) into 0
40.142 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
40.143 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.144 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
40.145 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
40.146 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
40.147 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
40.148 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.149 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
40.150 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))))) into 0
40.150 * [taylor]: Taking taylor expansion of 0 in l
40.151 * [backup-simplify]: Simplify 0 into 0
40.151 * [taylor]: Taking taylor expansion of 0 in h
40.151 * [backup-simplify]: Simplify 0 into 0
40.151 * [taylor]: Taking taylor expansion of 0 in h
40.151 * [backup-simplify]: Simplify 0 into 0
40.151 * [taylor]: Taking taylor expansion of 0 in h
40.151 * [backup-simplify]: Simplify 0 into 0
40.152 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
40.153 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
40.155 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
40.156 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
40.158 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.159 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.160 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
40.160 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
40.549 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
40.550 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.552 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
40.553 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.554 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
40.555 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
40.556 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
40.556 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
40.557 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.559 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
40.561 * [backup-simplify]: Simplify (+ (* 1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))))) into 0
40.562 * [taylor]: Taking taylor expansion of 0 in h
40.562 * [backup-simplify]: Simplify 0 into 0
40.562 * [taylor]: Taking taylor expansion of 0 in M
40.562 * [backup-simplify]: Simplify 0 into 0
40.562 * [taylor]: Taking taylor expansion of 0 in M
40.562 * [backup-simplify]: Simplify 0 into 0
40.562 * [taylor]: Taking taylor expansion of 0 in M
40.562 * [backup-simplify]: Simplify 0 into 0
40.562 * [taylor]: Taking taylor expansion of 0 in M
40.562 * [backup-simplify]: Simplify 0 into 0
40.562 * [taylor]: Taking taylor expansion of 0 in M
40.562 * [backup-simplify]: Simplify 0 into 0
40.563 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
40.564 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
40.566 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
40.567 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
40.569 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.570 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
40.574 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* +nan.0 +nan.0)))) (* 2 0)) into +nan.0
40.576 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (+ (* +nan.0 0) (* +nan.0 (pow (pow d 4) 1/3))))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
40.578 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow l 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow l 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow l 1)))) 6) into 0
40.580 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
40.581 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.581 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0)))) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.582 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
40.582 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
40.583 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
40.583 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.584 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.586 * [backup-simplify]: Simplify (+ (* 1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.586 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
40.586 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
40.586 * [taylor]: Taking taylor expansion of +nan.0 in M
40.586 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.586 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
40.586 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.586 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.586 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.586 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.586 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.586 * [taylor]: Taking taylor expansion of D in M
40.586 * [backup-simplify]: Simplify D into D
40.586 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.586 * [taylor]: Taking taylor expansion of M in M
40.586 * [backup-simplify]: Simplify 0 into 0
40.586 * [backup-simplify]: Simplify 1 into 1
40.586 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.586 * [backup-simplify]: Simplify (* 1 1) into 1
40.586 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.587 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.587 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
40.587 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
40.587 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
40.587 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
40.587 * [taylor]: Taking taylor expansion of 1/6 in M
40.587 * [backup-simplify]: Simplify 1/6 into 1/6
40.587 * [taylor]: Taking taylor expansion of (log l) in M
40.587 * [taylor]: Taking taylor expansion of l in M
40.587 * [backup-simplify]: Simplify l into l
40.587 * [backup-simplify]: Simplify (log l) into (log l)
40.587 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.587 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.587 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.587 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.587 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.587 * [taylor]: Taking taylor expansion of 1/3 in M
40.587 * [backup-simplify]: Simplify 1/3 into 1/3
40.587 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.587 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.587 * [taylor]: Taking taylor expansion of d in M
40.587 * [backup-simplify]: Simplify d into d
40.587 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.587 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.587 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.587 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.587 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.587 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.588 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.588 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.588 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.588 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
40.588 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
40.588 * [taylor]: Taking taylor expansion of +nan.0 in D
40.588 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.588 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
40.588 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
40.588 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.588 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.588 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.588 * [taylor]: Taking taylor expansion of D in D
40.588 * [backup-simplify]: Simplify 0 into 0
40.588 * [backup-simplify]: Simplify 1 into 1
40.589 * [backup-simplify]: Simplify (* 1 1) into 1
40.589 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
40.589 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
40.589 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
40.589 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
40.589 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
40.589 * [taylor]: Taking taylor expansion of 1/6 in D
40.589 * [backup-simplify]: Simplify 1/6 into 1/6
40.589 * [taylor]: Taking taylor expansion of (log l) in D
40.589 * [taylor]: Taking taylor expansion of l in D
40.589 * [backup-simplify]: Simplify l into l
40.589 * [backup-simplify]: Simplify (log l) into (log l)
40.589 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.589 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.589 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.589 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.589 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.589 * [taylor]: Taking taylor expansion of 1/3 in D
40.589 * [backup-simplify]: Simplify 1/3 into 1/3
40.589 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.589 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.589 * [taylor]: Taking taylor expansion of d in D
40.589 * [backup-simplify]: Simplify d into d
40.589 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.589 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.589 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.589 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.589 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.590 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.590 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.590 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.590 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.590 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.593 * [backup-simplify]: Simplify (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (/ 1 l) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (pow (* (/ 1 (/ 1 D)) (* (/ 1 (/ 1 M)) (* (/ 1 h) (* 1 1)))) 2)) (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (/ 1 l) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (* (pow (/ 1 D) -2) (* (pow (/ 1 M) -2) (* (/ 1 h) (* 1 1))))) (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (/ 1 l) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (pow (* (/ 1 (/ 1 D)) (* (/ 1 (/ 1 M)) (* 1 (* 1 1)))) 2)))) into (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))))))
40.594 * [backup-simplify]: Simplify (* (* (* (fabs (/ (cbrt (/ 1 (- d))) (cbrt (/ 1 (- l))))) (sqrt (/ (cbrt (/ 1 (- d))) (cbrt (/ 1 (- l)))))) (sqrt (/ (/ 1 (- d)) (/ 1 (- h))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (/ 1 (- h))))) into (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
40.594 * [approximate]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in (d l h M D) around 0
40.594 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in D
40.594 * [taylor]: Taking taylor expansion of -1/4 in D
40.594 * [backup-simplify]: Simplify -1/4 into -1/4
40.594 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in D
40.594 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in D
40.594 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.595 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.595 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in D
40.595 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.595 * [taylor]: Taking taylor expansion of D in D
40.595 * [backup-simplify]: Simplify 0 into 0
40.595 * [backup-simplify]: Simplify 1 into 1
40.595 * [taylor]: Taking taylor expansion of (pow M 2) in D
40.595 * [taylor]: Taking taylor expansion of M in D
40.595 * [backup-simplify]: Simplify M into M
40.595 * [backup-simplify]: Simplify (* 1 1) into 1
40.595 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.595 * [backup-simplify]: Simplify (* 1 (pow M 2)) into (pow M 2)
40.595 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow M 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow M 2))
40.595 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in D
40.595 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
40.596 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
40.596 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
40.596 * [taylor]: Taking taylor expansion of 1/6 in D
40.596 * [backup-simplify]: Simplify 1/6 into 1/6
40.596 * [taylor]: Taking taylor expansion of (log l) in D
40.596 * [taylor]: Taking taylor expansion of l in D
40.596 * [backup-simplify]: Simplify l into l
40.596 * [backup-simplify]: Simplify (log l) into (log l)
40.596 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.596 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.596 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in D
40.596 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in D
40.596 * [taylor]: Taking taylor expansion of (/ 1 h) in D
40.596 * [taylor]: Taking taylor expansion of h in D
40.596 * [backup-simplify]: Simplify h into h
40.596 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.596 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.596 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.596 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.596 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.596 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.596 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.596 * [taylor]: Taking taylor expansion of 1/3 in D
40.596 * [backup-simplify]: Simplify 1/3 into 1/3
40.596 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.596 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.596 * [taylor]: Taking taylor expansion of d in D
40.596 * [backup-simplify]: Simplify d into d
40.596 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.596 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.596 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.596 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.597 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.597 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in M
40.597 * [taylor]: Taking taylor expansion of -1/4 in M
40.597 * [backup-simplify]: Simplify -1/4 into -1/4
40.597 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in M
40.597 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.597 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.597 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.597 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.597 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.597 * [taylor]: Taking taylor expansion of D in M
40.597 * [backup-simplify]: Simplify D into D
40.597 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.597 * [taylor]: Taking taylor expansion of M in M
40.597 * [backup-simplify]: Simplify 0 into 0
40.597 * [backup-simplify]: Simplify 1 into 1
40.597 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.597 * [backup-simplify]: Simplify (* 1 1) into 1
40.597 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.597 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.597 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in M
40.597 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
40.597 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
40.597 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
40.597 * [taylor]: Taking taylor expansion of 1/6 in M
40.597 * [backup-simplify]: Simplify 1/6 into 1/6
40.598 * [taylor]: Taking taylor expansion of (log l) in M
40.598 * [taylor]: Taking taylor expansion of l in M
40.598 * [backup-simplify]: Simplify l into l
40.598 * [backup-simplify]: Simplify (log l) into (log l)
40.598 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.598 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.598 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in M
40.598 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in M
40.598 * [taylor]: Taking taylor expansion of (/ 1 h) in M
40.598 * [taylor]: Taking taylor expansion of h in M
40.598 * [backup-simplify]: Simplify h into h
40.598 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.598 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.598 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.598 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.598 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.598 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.598 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.598 * [taylor]: Taking taylor expansion of 1/3 in M
40.598 * [backup-simplify]: Simplify 1/3 into 1/3
40.598 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.598 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.598 * [taylor]: Taking taylor expansion of d in M
40.598 * [backup-simplify]: Simplify d into d
40.598 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.598 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.598 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.598 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.598 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.598 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in h
40.598 * [taylor]: Taking taylor expansion of -1/4 in h
40.598 * [backup-simplify]: Simplify -1/4 into -1/4
40.598 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in h
40.598 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
40.598 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
40.598 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.598 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
40.599 * [taylor]: Taking taylor expansion of (pow D 2) in h
40.599 * [taylor]: Taking taylor expansion of D in h
40.599 * [backup-simplify]: Simplify D into D
40.599 * [taylor]: Taking taylor expansion of (pow M 2) in h
40.599 * [taylor]: Taking taylor expansion of M in h
40.599 * [backup-simplify]: Simplify M into M
40.599 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.599 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.599 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.599 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.599 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in h
40.599 * [taylor]: Taking taylor expansion of (pow l 1/6) in h
40.599 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in h
40.599 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in h
40.599 * [taylor]: Taking taylor expansion of 1/6 in h
40.599 * [backup-simplify]: Simplify 1/6 into 1/6
40.599 * [taylor]: Taking taylor expansion of (log l) in h
40.599 * [taylor]: Taking taylor expansion of l in h
40.599 * [backup-simplify]: Simplify l into l
40.599 * [backup-simplify]: Simplify (log l) into (log l)
40.599 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.599 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.599 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in h
40.599 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
40.599 * [taylor]: Taking taylor expansion of (/ 1 h) in h
40.599 * [taylor]: Taking taylor expansion of h in h
40.599 * [backup-simplify]: Simplify 0 into 0
40.599 * [backup-simplify]: Simplify 1 into 1
40.600 * [backup-simplify]: Simplify (/ 1 1) into 1
40.600 * [backup-simplify]: Simplify (sqrt 0) into 0
40.601 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
40.601 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
40.601 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
40.601 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
40.601 * [taylor]: Taking taylor expansion of 1/3 in h
40.601 * [backup-simplify]: Simplify 1/3 into 1/3
40.601 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
40.601 * [taylor]: Taking taylor expansion of (pow d 4) in h
40.601 * [taylor]: Taking taylor expansion of d in h
40.601 * [backup-simplify]: Simplify d into d
40.601 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.601 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.601 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.601 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.601 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.601 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in l
40.601 * [taylor]: Taking taylor expansion of -1/4 in l
40.601 * [backup-simplify]: Simplify -1/4 into -1/4
40.601 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in l
40.601 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
40.601 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
40.601 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.601 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
40.601 * [taylor]: Taking taylor expansion of (pow D 2) in l
40.601 * [taylor]: Taking taylor expansion of D in l
40.601 * [backup-simplify]: Simplify D into D
40.601 * [taylor]: Taking taylor expansion of (pow M 2) in l
40.601 * [taylor]: Taking taylor expansion of M in l
40.602 * [backup-simplify]: Simplify M into M
40.602 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.602 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.602 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.602 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.602 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in l
40.602 * [taylor]: Taking taylor expansion of (pow l 1/6) in l
40.602 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in l
40.602 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in l
40.602 * [taylor]: Taking taylor expansion of 1/6 in l
40.602 * [backup-simplify]: Simplify 1/6 into 1/6
40.602 * [taylor]: Taking taylor expansion of (log l) in l
40.602 * [taylor]: Taking taylor expansion of l in l
40.602 * [backup-simplify]: Simplify 0 into 0
40.602 * [backup-simplify]: Simplify 1 into 1
40.602 * [backup-simplify]: Simplify (log 1) into 0
40.602 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.602 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.603 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.603 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in l
40.603 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
40.603 * [taylor]: Taking taylor expansion of (/ 1 h) in l
40.603 * [taylor]: Taking taylor expansion of h in l
40.603 * [backup-simplify]: Simplify h into h
40.603 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.603 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.603 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.603 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.603 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
40.603 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
40.603 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
40.603 * [taylor]: Taking taylor expansion of 1/3 in l
40.603 * [backup-simplify]: Simplify 1/3 into 1/3
40.603 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
40.603 * [taylor]: Taking taylor expansion of (pow d 4) in l
40.603 * [taylor]: Taking taylor expansion of d in l
40.603 * [backup-simplify]: Simplify d into d
40.603 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.603 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.603 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.603 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.603 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.603 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in d
40.603 * [taylor]: Taking taylor expansion of -1/4 in d
40.603 * [backup-simplify]: Simplify -1/4 into -1/4
40.603 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in d
40.603 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
40.603 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
40.603 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.603 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
40.603 * [taylor]: Taking taylor expansion of (pow D 2) in d
40.603 * [taylor]: Taking taylor expansion of D in d
40.603 * [backup-simplify]: Simplify D into D
40.603 * [taylor]: Taking taylor expansion of (pow M 2) in d
40.603 * [taylor]: Taking taylor expansion of M in d
40.603 * [backup-simplify]: Simplify M into M
40.604 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.604 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.604 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.604 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.604 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in d
40.604 * [taylor]: Taking taylor expansion of (pow l 1/6) in d
40.604 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in d
40.604 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in d
40.604 * [taylor]: Taking taylor expansion of 1/6 in d
40.604 * [backup-simplify]: Simplify 1/6 into 1/6
40.604 * [taylor]: Taking taylor expansion of (log l) in d
40.604 * [taylor]: Taking taylor expansion of l in d
40.604 * [backup-simplify]: Simplify l into l
40.604 * [backup-simplify]: Simplify (log l) into (log l)
40.604 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.604 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.604 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in d
40.604 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
40.604 * [taylor]: Taking taylor expansion of (/ 1 h) in d
40.604 * [taylor]: Taking taylor expansion of h in d
40.604 * [backup-simplify]: Simplify h into h
40.604 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.604 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.604 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.604 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.604 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
40.604 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
40.604 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
40.604 * [taylor]: Taking taylor expansion of 1/3 in d
40.604 * [backup-simplify]: Simplify 1/3 into 1/3
40.604 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
40.604 * [taylor]: Taking taylor expansion of (pow d 4) in d
40.604 * [taylor]: Taking taylor expansion of d in d
40.604 * [backup-simplify]: Simplify 0 into 0
40.604 * [backup-simplify]: Simplify 1 into 1
40.605 * [backup-simplify]: Simplify (* 1 1) into 1
40.605 * [backup-simplify]: Simplify (* 1 1) into 1
40.605 * [backup-simplify]: Simplify (log 1) into 0
40.605 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.605 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
40.606 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
40.606 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in d
40.606 * [taylor]: Taking taylor expansion of -1/4 in d
40.606 * [backup-simplify]: Simplify -1/4 into -1/4
40.606 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in d
40.606 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
40.606 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
40.606 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.606 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
40.606 * [taylor]: Taking taylor expansion of (pow D 2) in d
40.606 * [taylor]: Taking taylor expansion of D in d
40.606 * [backup-simplify]: Simplify D into D
40.606 * [taylor]: Taking taylor expansion of (pow M 2) in d
40.606 * [taylor]: Taking taylor expansion of M in d
40.606 * [backup-simplify]: Simplify M into M
40.606 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.606 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.606 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.606 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.606 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in d
40.606 * [taylor]: Taking taylor expansion of (pow l 1/6) in d
40.606 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in d
40.606 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in d
40.606 * [taylor]: Taking taylor expansion of 1/6 in d
40.606 * [backup-simplify]: Simplify 1/6 into 1/6
40.606 * [taylor]: Taking taylor expansion of (log l) in d
40.606 * [taylor]: Taking taylor expansion of l in d
40.606 * [backup-simplify]: Simplify l into l
40.606 * [backup-simplify]: Simplify (log l) into (log l)
40.606 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.606 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.606 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in d
40.606 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
40.606 * [taylor]: Taking taylor expansion of (/ 1 h) in d
40.606 * [taylor]: Taking taylor expansion of h in d
40.606 * [backup-simplify]: Simplify h into h
40.606 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.606 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.607 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.607 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.607 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
40.607 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
40.607 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
40.607 * [taylor]: Taking taylor expansion of 1/3 in d
40.607 * [backup-simplify]: Simplify 1/3 into 1/3
40.607 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
40.607 * [taylor]: Taking taylor expansion of (pow d 4) in d
40.607 * [taylor]: Taking taylor expansion of d in d
40.607 * [backup-simplify]: Simplify 0 into 0
40.607 * [backup-simplify]: Simplify 1 into 1
40.607 * [backup-simplify]: Simplify (* 1 1) into 1
40.607 * [backup-simplify]: Simplify (* 1 1) into 1
40.608 * [backup-simplify]: Simplify (log 1) into 0
40.608 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.608 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
40.608 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
40.608 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (pow d 4/3)) into (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))
40.608 * [backup-simplify]: Simplify (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) into (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.608 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.609 * [backup-simplify]: Simplify (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
40.609 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in l
40.609 * [taylor]: Taking taylor expansion of -1/4 in l
40.609 * [backup-simplify]: Simplify -1/4 into -1/4
40.609 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in l
40.609 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
40.609 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
40.609 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.609 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
40.609 * [taylor]: Taking taylor expansion of (pow D 2) in l
40.609 * [taylor]: Taking taylor expansion of D in l
40.609 * [backup-simplify]: Simplify D into D
40.609 * [taylor]: Taking taylor expansion of (pow M 2) in l
40.609 * [taylor]: Taking taylor expansion of M in l
40.609 * [backup-simplify]: Simplify M into M
40.609 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.609 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.609 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.609 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.609 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in l
40.609 * [taylor]: Taking taylor expansion of (pow l 1/6) in l
40.609 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in l
40.609 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in l
40.609 * [taylor]: Taking taylor expansion of 1/6 in l
40.609 * [backup-simplify]: Simplify 1/6 into 1/6
40.609 * [taylor]: Taking taylor expansion of (log l) in l
40.609 * [taylor]: Taking taylor expansion of l in l
40.609 * [backup-simplify]: Simplify 0 into 0
40.609 * [backup-simplify]: Simplify 1 into 1
40.610 * [backup-simplify]: Simplify (log 1) into 0
40.610 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.610 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.610 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.610 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in l
40.610 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
40.610 * [taylor]: Taking taylor expansion of (/ 1 h) in l
40.610 * [taylor]: Taking taylor expansion of h in l
40.610 * [backup-simplify]: Simplify h into h
40.610 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.610 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.610 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.610 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.610 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
40.610 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
40.610 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
40.610 * [taylor]: Taking taylor expansion of 1/3 in l
40.610 * [backup-simplify]: Simplify 1/3 into 1/3
40.610 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
40.610 * [taylor]: Taking taylor expansion of (pow d 4) in l
40.610 * [taylor]: Taking taylor expansion of d in l
40.610 * [backup-simplify]: Simplify d into d
40.611 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.611 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.611 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.611 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.611 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.611 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) into (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))
40.611 * [backup-simplify]: Simplify (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) into (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.611 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.612 * [backup-simplify]: Simplify (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))
40.612 * [taylor]: Taking taylor expansion of (* -1/4 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) in h
40.612 * [taylor]: Taking taylor expansion of -1/4 in h
40.612 * [backup-simplify]: Simplify -1/4 into -1/4
40.612 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) in h
40.612 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
40.612 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
40.612 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.612 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
40.612 * [taylor]: Taking taylor expansion of (pow D 2) in h
40.612 * [taylor]: Taking taylor expansion of D in h
40.612 * [backup-simplify]: Simplify D into D
40.612 * [taylor]: Taking taylor expansion of (pow M 2) in h
40.612 * [taylor]: Taking taylor expansion of M in h
40.612 * [backup-simplify]: Simplify M into M
40.612 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.612 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.612 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.612 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.612 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))) in h
40.612 * [taylor]: Taking taylor expansion of (pow l 1/6) in h
40.612 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in h
40.612 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in h
40.612 * [taylor]: Taking taylor expansion of 1/6 in h
40.612 * [backup-simplify]: Simplify 1/6 into 1/6
40.612 * [taylor]: Taking taylor expansion of (log l) in h
40.612 * [taylor]: Taking taylor expansion of l in h
40.612 * [backup-simplify]: Simplify l into l
40.612 * [backup-simplify]: Simplify (log l) into (log l)
40.612 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.612 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.612 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)) in h
40.612 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
40.612 * [taylor]: Taking taylor expansion of (/ 1 h) in h
40.612 * [taylor]: Taking taylor expansion of h in h
40.612 * [backup-simplify]: Simplify 0 into 0
40.612 * [backup-simplify]: Simplify 1 into 1
40.613 * [backup-simplify]: Simplify (/ 1 1) into 1
40.613 * [backup-simplify]: Simplify (sqrt 0) into 0
40.614 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
40.614 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
40.614 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
40.614 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
40.614 * [taylor]: Taking taylor expansion of 1/3 in h
40.614 * [backup-simplify]: Simplify 1/3 into 1/3
40.614 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
40.614 * [taylor]: Taking taylor expansion of (pow d 4) in h
40.614 * [taylor]: Taking taylor expansion of d in h
40.614 * [backup-simplify]: Simplify d into d
40.614 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.614 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.614 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.614 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.614 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.614 * [backup-simplify]: Simplify (* 0 (pow (pow d 4) 1/3)) into 0
40.614 * [backup-simplify]: Simplify (* (pow l 1/6) 0) into 0
40.614 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) into 0
40.615 * [backup-simplify]: Simplify (* -1/4 0) into 0
40.615 * [taylor]: Taking taylor expansion of 0 in M
40.615 * [backup-simplify]: Simplify 0 into 0
40.615 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.616 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.616 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
40.617 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.617 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (* 4 (log d)))) into 0
40.617 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
40.617 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (pow d 4/3))) into 0
40.618 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
40.618 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.619 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.619 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into 0
40.619 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.619 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.619 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.619 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.620 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
40.620 * [backup-simplify]: Simplify (+ (* -1/4 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
40.620 * [taylor]: Taking taylor expansion of 0 in l
40.620 * [backup-simplify]: Simplify 0 into 0
40.620 * [taylor]: Taking taylor expansion of 0 in h
40.620 * [backup-simplify]: Simplify 0 into 0
40.620 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.620 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.621 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.621 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.622 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.622 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (pow (pow d 4) 1/3))) into 0
40.623 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
40.623 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.623 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.624 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.624 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into 0
40.624 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.624 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.624 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.624 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.625 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
40.625 * [backup-simplify]: Simplify (+ (* -1/4 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
40.625 * [taylor]: Taking taylor expansion of 0 in h
40.625 * [backup-simplify]: Simplify 0 into 0
40.625 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.625 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.626 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.626 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.627 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.627 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (pow (pow d 4) 1/3))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
40.628 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
40.628 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.629 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.630 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0)) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.630 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.630 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.630 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.631 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.632 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.633 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.633 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
40.633 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
40.633 * [taylor]: Taking taylor expansion of +nan.0 in M
40.633 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.633 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
40.633 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.633 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.633 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.633 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.633 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.633 * [taylor]: Taking taylor expansion of D in M
40.633 * [backup-simplify]: Simplify D into D
40.633 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.633 * [taylor]: Taking taylor expansion of M in M
40.634 * [backup-simplify]: Simplify 0 into 0
40.634 * [backup-simplify]: Simplify 1 into 1
40.634 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.634 * [backup-simplify]: Simplify (* 1 1) into 1
40.634 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.634 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.634 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
40.634 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
40.634 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
40.634 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
40.634 * [taylor]: Taking taylor expansion of 1/6 in M
40.634 * [backup-simplify]: Simplify 1/6 into 1/6
40.634 * [taylor]: Taking taylor expansion of (log l) in M
40.634 * [taylor]: Taking taylor expansion of l in M
40.635 * [backup-simplify]: Simplify l into l
40.635 * [backup-simplify]: Simplify (log l) into (log l)
40.635 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.635 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.635 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.635 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.635 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.635 * [taylor]: Taking taylor expansion of 1/3 in M
40.635 * [backup-simplify]: Simplify 1/3 into 1/3
40.635 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.635 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.635 * [taylor]: Taking taylor expansion of d in M
40.635 * [backup-simplify]: Simplify d into d
40.635 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.635 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.635 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.635 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.635 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.636 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.636 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.636 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.637 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.637 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
40.637 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
40.637 * [taylor]: Taking taylor expansion of +nan.0 in D
40.637 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.637 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
40.637 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
40.637 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.637 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.637 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.637 * [taylor]: Taking taylor expansion of D in D
40.637 * [backup-simplify]: Simplify 0 into 0
40.637 * [backup-simplify]: Simplify 1 into 1
40.638 * [backup-simplify]: Simplify (* 1 1) into 1
40.638 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
40.638 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
40.638 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
40.638 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
40.638 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
40.638 * [taylor]: Taking taylor expansion of 1/6 in D
40.638 * [backup-simplify]: Simplify 1/6 into 1/6
40.638 * [taylor]: Taking taylor expansion of (log l) in D
40.638 * [taylor]: Taking taylor expansion of l in D
40.638 * [backup-simplify]: Simplify l into l
40.638 * [backup-simplify]: Simplify (log l) into (log l)
40.638 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.638 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.639 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.639 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.639 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.639 * [taylor]: Taking taylor expansion of 1/3 in D
40.639 * [backup-simplify]: Simplify 1/3 into 1/3
40.639 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.639 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.639 * [taylor]: Taking taylor expansion of d in D
40.639 * [backup-simplify]: Simplify d into d
40.639 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.639 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.639 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.639 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.639 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.639 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.640 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.640 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.641 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.641 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.642 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.643 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.646 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
40.647 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.648 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (* 4 (log d))))) into 0
40.649 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.649 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.650 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
40.651 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (pow d 4/3)))) into 0
40.652 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow l 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow l 1)))) 2) into 0
40.653 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
40.655 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.655 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
40.656 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.656 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.657 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
40.657 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.659 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
40.660 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
40.660 * [taylor]: Taking taylor expansion of 0 in l
40.660 * [backup-simplify]: Simplify 0 into 0
40.660 * [taylor]: Taking taylor expansion of 0 in h
40.660 * [backup-simplify]: Simplify 0 into 0
40.660 * [taylor]: Taking taylor expansion of 0 in h
40.660 * [backup-simplify]: Simplify 0 into 0
40.661 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
40.661 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
40.663 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
40.664 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
40.665 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.665 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.666 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
40.666 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
40.673 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
40.674 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.674 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
40.676 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.676 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
40.677 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.677 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.678 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
40.678 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.679 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) into 0
40.681 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
40.681 * [taylor]: Taking taylor expansion of 0 in h
40.681 * [backup-simplify]: Simplify 0 into 0
40.681 * [taylor]: Taking taylor expansion of 0 in M
40.681 * [backup-simplify]: Simplify 0 into 0
40.681 * [taylor]: Taking taylor expansion of 0 in M
40.681 * [backup-simplify]: Simplify 0 into 0
40.681 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
40.682 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
40.684 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
40.684 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
40.686 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.687 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
40.690 * [backup-simplify]: Simplify (/ (- 0 (pow +nan.0 2) (+)) (* 2 0)) into +nan.0
40.691 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (* +nan.0 (pow (pow d 4) 1/3)))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
40.692 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow l 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow l 1)))) 2) into 0
40.693 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log l)))) into 0
40.695 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.695 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0))) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.696 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.696 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.697 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
40.698 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.699 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.701 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.701 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
40.701 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
40.701 * [taylor]: Taking taylor expansion of +nan.0 in M
40.701 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.701 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
40.701 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.701 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.701 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.701 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.701 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.701 * [taylor]: Taking taylor expansion of D in M
40.701 * [backup-simplify]: Simplify D into D
40.701 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.701 * [taylor]: Taking taylor expansion of M in M
40.701 * [backup-simplify]: Simplify 0 into 0
40.701 * [backup-simplify]: Simplify 1 into 1
40.701 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.702 * [backup-simplify]: Simplify (* 1 1) into 1
40.702 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.702 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.702 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
40.702 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
40.702 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
40.702 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
40.702 * [taylor]: Taking taylor expansion of 1/6 in M
40.702 * [backup-simplify]: Simplify 1/6 into 1/6
40.702 * [taylor]: Taking taylor expansion of (log l) in M
40.702 * [taylor]: Taking taylor expansion of l in M
40.702 * [backup-simplify]: Simplify l into l
40.702 * [backup-simplify]: Simplify (log l) into (log l)
40.702 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.702 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.702 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.703 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.703 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.703 * [taylor]: Taking taylor expansion of 1/3 in M
40.703 * [backup-simplify]: Simplify 1/3 into 1/3
40.703 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.703 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.703 * [taylor]: Taking taylor expansion of d in M
40.703 * [backup-simplify]: Simplify d into d
40.703 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.703 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.703 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.703 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.703 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.703 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.704 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.704 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.705 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.705 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
40.705 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
40.705 * [taylor]: Taking taylor expansion of +nan.0 in D
40.705 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.705 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
40.705 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
40.705 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.705 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.705 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.705 * [taylor]: Taking taylor expansion of D in D
40.705 * [backup-simplify]: Simplify 0 into 0
40.705 * [backup-simplify]: Simplify 1 into 1
40.705 * [backup-simplify]: Simplify (* 1 1) into 1
40.706 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
40.706 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
40.706 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
40.706 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
40.706 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
40.706 * [taylor]: Taking taylor expansion of 1/6 in D
40.706 * [backup-simplify]: Simplify 1/6 into 1/6
40.706 * [taylor]: Taking taylor expansion of (log l) in D
40.706 * [taylor]: Taking taylor expansion of l in D
40.706 * [backup-simplify]: Simplify l into l
40.706 * [backup-simplify]: Simplify (log l) into (log l)
40.706 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.706 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.706 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.706 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.706 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.706 * [taylor]: Taking taylor expansion of 1/3 in D
40.706 * [backup-simplify]: Simplify 1/3 into 1/3
40.706 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.706 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.706 * [taylor]: Taking taylor expansion of d in D
40.706 * [backup-simplify]: Simplify d into d
40.706 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.707 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.707 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.707 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.707 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.707 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.707 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.707 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.708 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.708 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.709 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.709 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.710 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.711 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.712 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.712 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
40.713 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.714 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.714 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
40.715 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.715 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.715 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
40.716 * [backup-simplify]: Simplify (- (/ 0 (pow D 2)) (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (/ 0 (pow D 2))))) into 0
40.716 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) 0) (* 0 (* (pow l 1/6) (pow (pow d 4) 1/3)))) into 0
40.717 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
40.717 * [backup-simplify]: Simplify (- 0) into 0
40.717 * [taylor]: Taking taylor expansion of 0 in D
40.717 * [backup-simplify]: Simplify 0 into 0
40.717 * [taylor]: Taking taylor expansion of 0 in D
40.717 * [backup-simplify]: Simplify 0 into 0
40.717 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.718 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.718 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.719 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.720 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.721 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow l 1)))) 1) into 0
40.721 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log l))) into 0
40.722 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.722 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
40.723 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.724 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (fabs (pow (/ l d) 1/3)) (/ 0 1)))) into 0
40.724 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ l d) 1/3)) 0) (* 0 (* (pow l 1/6) (pow (pow d 4) 1/3)))) into 0
40.725 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into 0
40.726 * [backup-simplify]: Simplify (- 0) into 0
40.726 * [backup-simplify]: Simplify 0 into 0
40.727 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
40.728 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
40.733 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
40.733 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.734 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 4 (log d)))))) into 0
40.736 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.736 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.737 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
40.738 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4/3))))) into 0
40.741 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow l 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow l 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow l 1)))) 6) into 0
40.742 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
40.744 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.745 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
40.746 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
40.746 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
40.747 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
40.748 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.749 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
40.751 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))))) into 0
40.751 * [taylor]: Taking taylor expansion of 0 in l
40.751 * [backup-simplify]: Simplify 0 into 0
40.751 * [taylor]: Taking taylor expansion of 0 in h
40.751 * [backup-simplify]: Simplify 0 into 0
40.751 * [taylor]: Taking taylor expansion of 0 in h
40.751 * [backup-simplify]: Simplify 0 into 0
40.751 * [taylor]: Taking taylor expansion of 0 in h
40.751 * [backup-simplify]: Simplify 0 into 0
40.752 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
40.753 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
40.756 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
40.757 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
40.759 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.759 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.760 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
40.761 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
40.766 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
40.767 * [backup-simplify]: Simplify (+ (* (- -1) (log l)) 0) into (log l)
40.768 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
40.769 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.770 * [backup-simplify]: Simplify (+ (* (pow l 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
40.771 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
40.772 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
40.773 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
40.774 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.775 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3))))))) into 0
40.777 * [backup-simplify]: Simplify (+ (* -1/4 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))))) into 0
40.777 * [taylor]: Taking taylor expansion of 0 in h
40.777 * [backup-simplify]: Simplify 0 into 0
40.777 * [taylor]: Taking taylor expansion of 0 in M
40.777 * [backup-simplify]: Simplify 0 into 0
40.777 * [taylor]: Taking taylor expansion of 0 in M
40.777 * [backup-simplify]: Simplify 0 into 0
40.777 * [taylor]: Taking taylor expansion of 0 in M
40.777 * [backup-simplify]: Simplify 0 into 0
40.778 * [taylor]: Taking taylor expansion of 0 in M
40.778 * [backup-simplify]: Simplify 0 into 0
40.778 * [taylor]: Taking taylor expansion of 0 in M
40.778 * [backup-simplify]: Simplify 0 into 0
40.779 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
40.779 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
40.782 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
40.784 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
40.785 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.786 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
40.790 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* +nan.0 +nan.0)))) (* 2 0)) into +nan.0
40.792 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (+ (* +nan.0 0) (* +nan.0 (pow (pow d 4) 1/3))))) into (- (* +nan.0 (pow (pow d 4) 1/3)))
40.794 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow l 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow l 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow l 1)))) 6) into 0
40.796 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log l))))) into 0
40.797 * [backup-simplify]: Simplify (* (exp (* 1/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
40.798 * [backup-simplify]: Simplify (+ (* (pow l 1/6) (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (+ (* 0 (- (* +nan.0 (pow (pow d 4) 1/3)))) (* 0 0)))) into (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.799 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
40.800 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
40.800 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
40.801 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.802 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow l 1/6) (pow (pow d 4) 1/3))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.803 * [backup-simplify]: Simplify (+ (* -1/4 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.803 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in M
40.803 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in M
40.803 * [taylor]: Taking taylor expansion of +nan.0 in M
40.803 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.803 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow l 1/6) (pow (pow d 4) 1/3))) in M
40.803 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.803 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.803 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.803 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.803 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.803 * [taylor]: Taking taylor expansion of D in M
40.803 * [backup-simplify]: Simplify D into D
40.803 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.803 * [taylor]: Taking taylor expansion of M in M
40.803 * [backup-simplify]: Simplify 0 into 0
40.803 * [backup-simplify]: Simplify 1 into 1
40.803 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.804 * [backup-simplify]: Simplify (* 1 1) into 1
40.804 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.804 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.804 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in M
40.804 * [taylor]: Taking taylor expansion of (pow l 1/6) in M
40.804 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in M
40.804 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in M
40.804 * [taylor]: Taking taylor expansion of 1/6 in M
40.804 * [backup-simplify]: Simplify 1/6 into 1/6
40.804 * [taylor]: Taking taylor expansion of (log l) in M
40.804 * [taylor]: Taking taylor expansion of l in M
40.804 * [backup-simplify]: Simplify l into l
40.804 * [backup-simplify]: Simplify (log l) into (log l)
40.804 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.804 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.804 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.804 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.804 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.804 * [taylor]: Taking taylor expansion of 1/3 in M
40.804 * [backup-simplify]: Simplify 1/3 into 1/3
40.804 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.804 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.804 * [taylor]: Taking taylor expansion of d in M
40.804 * [backup-simplify]: Simplify d into d
40.804 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.804 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.804 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.804 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.804 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.805 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.805 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.805 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.805 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.805 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) in D
40.805 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) in D
40.805 * [taylor]: Taking taylor expansion of +nan.0 in D
40.805 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.805 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow l 1/6) (pow (pow d 4) 1/3))) in D
40.805 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
40.805 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.805 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.805 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.805 * [taylor]: Taking taylor expansion of D in D
40.805 * [backup-simplify]: Simplify 0 into 0
40.806 * [backup-simplify]: Simplify 1 into 1
40.806 * [backup-simplify]: Simplify (* 1 1) into 1
40.806 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
40.806 * [taylor]: Taking taylor expansion of (* (pow l 1/6) (pow (pow d 4) 1/3)) in D
40.806 * [taylor]: Taking taylor expansion of (pow l 1/6) in D
40.806 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log l))) in D
40.806 * [taylor]: Taking taylor expansion of (* 1/6 (log l)) in D
40.806 * [taylor]: Taking taylor expansion of 1/6 in D
40.806 * [backup-simplify]: Simplify 1/6 into 1/6
40.806 * [taylor]: Taking taylor expansion of (log l) in D
40.806 * [taylor]: Taking taylor expansion of l in D
40.806 * [backup-simplify]: Simplify l into l
40.806 * [backup-simplify]: Simplify (log l) into (log l)
40.806 * [backup-simplify]: Simplify (* 1/6 (log l)) into (* 1/6 (log l))
40.806 * [backup-simplify]: Simplify (exp (* 1/6 (log l))) into (pow l 1/6)
40.806 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.806 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.806 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.806 * [taylor]: Taking taylor expansion of 1/3 in D
40.806 * [backup-simplify]: Simplify 1/3 into 1/3
40.806 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.806 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.806 * [taylor]: Taking taylor expansion of d in D
40.806 * [backup-simplify]: Simplify d into d
40.806 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.806 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.806 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.806 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.807 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.807 * [backup-simplify]: Simplify (* (pow l 1/6) (pow (pow d 4) 1/3)) into (* (pow l 1/6) (pow (pow d 4) 1/3))
40.807 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))
40.807 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))
40.807 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.807 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow l 1/6) (pow (pow d 4) 1/3)))))
40.810 * [backup-simplify]: Simplify (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (/ 1 (- l)) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (pow (* (/ 1 (/ 1 (- D))) (* (/ 1 (/ 1 (- M))) (* (/ 1 (- h)) (* 1 1)))) 2)) (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (/ 1 (- l)) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (* (pow (/ 1 (- D)) -2) (* (pow (/ 1 (- M)) -2) (* (/ 1 (- h)) (* 1 1))))) (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (/ 1 (- l)) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (pow (* (/ 1 (/ 1 (- D))) (* (/ 1 (/ 1 (- M))) (* 1 (* 1 1)))) 2)))) into (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 l) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 l) 1/6)))))))))
40.810 * * * * [progress]: [ 3 / 4 ] generating series at (2 2)
40.811 * [backup-simplify]: Simplify (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)) into (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
40.811 * [approximate]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in (d l h M D) around 0
40.811 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in D
40.811 * [taylor]: Taking taylor expansion of 1/8 in D
40.811 * [backup-simplify]: Simplify 1/8 into 1/8
40.811 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in D
40.811 * [taylor]: Taking taylor expansion of (sqrt h) in D
40.811 * [taylor]: Taking taylor expansion of h in D
40.811 * [backup-simplify]: Simplify h into h
40.811 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
40.811 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
40.811 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in D
40.811 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in D
40.811 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in D
40.811 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.811 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in D
40.811 * [taylor]: Taking taylor expansion of (pow M 2) in D
40.811 * [taylor]: Taking taylor expansion of M in D
40.811 * [backup-simplify]: Simplify M into M
40.811 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.811 * [taylor]: Taking taylor expansion of D in D
40.812 * [backup-simplify]: Simplify 0 into 0
40.812 * [backup-simplify]: Simplify 1 into 1
40.812 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in D
40.812 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in D
40.812 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in D
40.812 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in D
40.812 * [taylor]: Taking taylor expansion of 1/6 in D
40.812 * [backup-simplify]: Simplify 1/6 into 1/6
40.812 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in D
40.812 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in D
40.812 * [taylor]: Taking taylor expansion of (pow l 7) in D
40.812 * [taylor]: Taking taylor expansion of l in D
40.812 * [backup-simplify]: Simplify l into l
40.812 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.812 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.812 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.812 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.812 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
40.812 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
40.812 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
40.812 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
40.812 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in D
40.812 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in D
40.812 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in D
40.812 * [taylor]: Taking taylor expansion of 1/3 in D
40.812 * [backup-simplify]: Simplify 1/3 into 1/3
40.812 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in D
40.812 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in D
40.812 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.812 * [taylor]: Taking taylor expansion of d in D
40.812 * [backup-simplify]: Simplify d into d
40.812 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.812 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.812 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
40.813 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
40.813 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
40.813 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
40.813 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in M
40.813 * [taylor]: Taking taylor expansion of 1/8 in M
40.813 * [backup-simplify]: Simplify 1/8 into 1/8
40.813 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in M
40.813 * [taylor]: Taking taylor expansion of (sqrt h) in M
40.813 * [taylor]: Taking taylor expansion of h in M
40.813 * [backup-simplify]: Simplify h into h
40.813 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
40.813 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
40.813 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in M
40.813 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in M
40.813 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in M
40.813 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.813 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
40.813 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.813 * [taylor]: Taking taylor expansion of M in M
40.813 * [backup-simplify]: Simplify 0 into 0
40.813 * [backup-simplify]: Simplify 1 into 1
40.813 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.813 * [taylor]: Taking taylor expansion of D in M
40.813 * [backup-simplify]: Simplify D into D
40.813 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in M
40.813 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in M
40.813 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in M
40.813 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in M
40.813 * [taylor]: Taking taylor expansion of 1/6 in M
40.813 * [backup-simplify]: Simplify 1/6 into 1/6
40.813 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in M
40.813 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in M
40.813 * [taylor]: Taking taylor expansion of (pow l 7) in M
40.813 * [taylor]: Taking taylor expansion of l in M
40.813 * [backup-simplify]: Simplify l into l
40.813 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.813 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.813 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.813 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.813 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
40.814 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
40.814 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
40.814 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
40.814 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in M
40.814 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in M
40.814 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in M
40.814 * [taylor]: Taking taylor expansion of 1/3 in M
40.814 * [backup-simplify]: Simplify 1/3 into 1/3
40.814 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in M
40.814 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in M
40.814 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.814 * [taylor]: Taking taylor expansion of d in M
40.814 * [backup-simplify]: Simplify d into d
40.814 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.814 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.814 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
40.814 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
40.814 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
40.814 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
40.814 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in h
40.814 * [taylor]: Taking taylor expansion of 1/8 in h
40.814 * [backup-simplify]: Simplify 1/8 into 1/8
40.814 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in h
40.814 * [taylor]: Taking taylor expansion of (sqrt h) in h
40.814 * [taylor]: Taking taylor expansion of h in h
40.814 * [backup-simplify]: Simplify 0 into 0
40.814 * [backup-simplify]: Simplify 1 into 1
40.816 * [backup-simplify]: Simplify (sqrt 0) into 0
40.817 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
40.817 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in h
40.817 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in h
40.817 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in h
40.817 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.817 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in h
40.817 * [taylor]: Taking taylor expansion of (pow M 2) in h
40.817 * [taylor]: Taking taylor expansion of M in h
40.818 * [backup-simplify]: Simplify M into M
40.818 * [taylor]: Taking taylor expansion of (pow D 2) in h
40.818 * [taylor]: Taking taylor expansion of D in h
40.818 * [backup-simplify]: Simplify D into D
40.818 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in h
40.818 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in h
40.818 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in h
40.818 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in h
40.818 * [taylor]: Taking taylor expansion of 1/6 in h
40.818 * [backup-simplify]: Simplify 1/6 into 1/6
40.818 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in h
40.818 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in h
40.818 * [taylor]: Taking taylor expansion of (pow l 7) in h
40.818 * [taylor]: Taking taylor expansion of l in h
40.818 * [backup-simplify]: Simplify l into l
40.818 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.818 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.818 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.818 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.818 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
40.818 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
40.818 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
40.818 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
40.818 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in h
40.818 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in h
40.818 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in h
40.818 * [taylor]: Taking taylor expansion of 1/3 in h
40.818 * [backup-simplify]: Simplify 1/3 into 1/3
40.818 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in h
40.818 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in h
40.818 * [taylor]: Taking taylor expansion of (pow d 4) in h
40.818 * [taylor]: Taking taylor expansion of d in h
40.818 * [backup-simplify]: Simplify d into d
40.818 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.818 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.819 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
40.819 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
40.819 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
40.819 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
40.819 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in l
40.819 * [taylor]: Taking taylor expansion of 1/8 in l
40.819 * [backup-simplify]: Simplify 1/8 into 1/8
40.819 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in l
40.819 * [taylor]: Taking taylor expansion of (sqrt h) in l
40.819 * [taylor]: Taking taylor expansion of h in l
40.819 * [backup-simplify]: Simplify h into h
40.819 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
40.819 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
40.819 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in l
40.819 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in l
40.819 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in l
40.819 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.819 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
40.819 * [taylor]: Taking taylor expansion of (pow M 2) in l
40.819 * [taylor]: Taking taylor expansion of M in l
40.819 * [backup-simplify]: Simplify M into M
40.819 * [taylor]: Taking taylor expansion of (pow D 2) in l
40.819 * [taylor]: Taking taylor expansion of D in l
40.819 * [backup-simplify]: Simplify D into D
40.819 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in l
40.819 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in l
40.819 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in l
40.819 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in l
40.819 * [taylor]: Taking taylor expansion of 1/6 in l
40.819 * [backup-simplify]: Simplify 1/6 into 1/6
40.819 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in l
40.819 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in l
40.819 * [taylor]: Taking taylor expansion of (pow l 7) in l
40.819 * [taylor]: Taking taylor expansion of l in l
40.819 * [backup-simplify]: Simplify 0 into 0
40.819 * [backup-simplify]: Simplify 1 into 1
40.820 * [backup-simplify]: Simplify (* 1 1) into 1
40.820 * [backup-simplify]: Simplify (* 1 1) into 1
40.820 * [backup-simplify]: Simplify (* 1 1) into 1
40.821 * [backup-simplify]: Simplify (* 1 1) into 1
40.821 * [backup-simplify]: Simplify (/ 1 1) into 1
40.822 * [backup-simplify]: Simplify (log 1) into 0
40.822 * [backup-simplify]: Simplify (+ (* (- 7) (log l)) 0) into (- (* 7 (log l)))
40.822 * [backup-simplify]: Simplify (* 1/6 (- (* 7 (log l)))) into (* -7/6 (log l))
40.822 * [backup-simplify]: Simplify (exp (* -7/6 (log l))) into (pow l -7/6)
40.822 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in l
40.822 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in l
40.822 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in l
40.822 * [taylor]: Taking taylor expansion of 1/3 in l
40.823 * [backup-simplify]: Simplify 1/3 into 1/3
40.823 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in l
40.823 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in l
40.823 * [taylor]: Taking taylor expansion of (pow d 4) in l
40.823 * [taylor]: Taking taylor expansion of d in l
40.823 * [backup-simplify]: Simplify d into d
40.823 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.823 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.823 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
40.823 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
40.823 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
40.823 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
40.823 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in d
40.823 * [taylor]: Taking taylor expansion of 1/8 in d
40.823 * [backup-simplify]: Simplify 1/8 into 1/8
40.823 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in d
40.823 * [taylor]: Taking taylor expansion of (sqrt h) in d
40.823 * [taylor]: Taking taylor expansion of h in d
40.823 * [backup-simplify]: Simplify h into h
40.824 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
40.824 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
40.824 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in d
40.824 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in d
40.824 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in d
40.824 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.824 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
40.824 * [taylor]: Taking taylor expansion of (pow M 2) in d
40.824 * [taylor]: Taking taylor expansion of M in d
40.824 * [backup-simplify]: Simplify M into M
40.824 * [taylor]: Taking taylor expansion of (pow D 2) in d
40.824 * [taylor]: Taking taylor expansion of D in d
40.824 * [backup-simplify]: Simplify D into D
40.824 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in d
40.824 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in d
40.824 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in d
40.824 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in d
40.824 * [taylor]: Taking taylor expansion of 1/6 in d
40.824 * [backup-simplify]: Simplify 1/6 into 1/6
40.824 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in d
40.824 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in d
40.824 * [taylor]: Taking taylor expansion of (pow l 7) in d
40.824 * [taylor]: Taking taylor expansion of l in d
40.824 * [backup-simplify]: Simplify l into l
40.824 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.825 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.825 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.825 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.825 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
40.825 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
40.825 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
40.825 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
40.825 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in d
40.825 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in d
40.825 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in d
40.825 * [taylor]: Taking taylor expansion of 1/3 in d
40.825 * [backup-simplify]: Simplify 1/3 into 1/3
40.825 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in d
40.825 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in d
40.825 * [taylor]: Taking taylor expansion of (pow d 4) in d
40.825 * [taylor]: Taking taylor expansion of d in d
40.825 * [backup-simplify]: Simplify 0 into 0
40.825 * [backup-simplify]: Simplify 1 into 1
40.826 * [backup-simplify]: Simplify (* 1 1) into 1
40.826 * [backup-simplify]: Simplify (* 1 1) into 1
40.827 * [backup-simplify]: Simplify (/ 1 1) into 1
40.827 * [backup-simplify]: Simplify (log 1) into 0
40.828 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
40.828 * [backup-simplify]: Simplify (* 1/3 (- (* 4 (log d)))) into (* -4/3 (log d))
40.828 * [backup-simplify]: Simplify (exp (* -4/3 (log d))) into (pow d -4/3)
40.828 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in d
40.828 * [taylor]: Taking taylor expansion of 1/8 in d
40.828 * [backup-simplify]: Simplify 1/8 into 1/8
40.828 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in d
40.828 * [taylor]: Taking taylor expansion of (sqrt h) in d
40.828 * [taylor]: Taking taylor expansion of h in d
40.828 * [backup-simplify]: Simplify h into h
40.828 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
40.828 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
40.828 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in d
40.828 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in d
40.828 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in d
40.828 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.829 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in d
40.829 * [taylor]: Taking taylor expansion of (pow M 2) in d
40.829 * [taylor]: Taking taylor expansion of M in d
40.829 * [backup-simplify]: Simplify M into M
40.829 * [taylor]: Taking taylor expansion of (pow D 2) in d
40.829 * [taylor]: Taking taylor expansion of D in d
40.829 * [backup-simplify]: Simplify D into D
40.829 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in d
40.829 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in d
40.829 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in d
40.829 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in d
40.829 * [taylor]: Taking taylor expansion of 1/6 in d
40.829 * [backup-simplify]: Simplify 1/6 into 1/6
40.829 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in d
40.829 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in d
40.829 * [taylor]: Taking taylor expansion of (pow l 7) in d
40.829 * [taylor]: Taking taylor expansion of l in d
40.829 * [backup-simplify]: Simplify l into l
40.829 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.829 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.829 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.829 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.829 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
40.830 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
40.830 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
40.830 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
40.830 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in d
40.830 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in d
40.830 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in d
40.830 * [taylor]: Taking taylor expansion of 1/3 in d
40.830 * [backup-simplify]: Simplify 1/3 into 1/3
40.830 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in d
40.830 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in d
40.830 * [taylor]: Taking taylor expansion of (pow d 4) in d
40.830 * [taylor]: Taking taylor expansion of d in d
40.830 * [backup-simplify]: Simplify 0 into 0
40.830 * [backup-simplify]: Simplify 1 into 1
40.831 * [backup-simplify]: Simplify (* 1 1) into 1
40.831 * [backup-simplify]: Simplify (* 1 1) into 1
40.831 * [backup-simplify]: Simplify (/ 1 1) into 1
40.832 * [backup-simplify]: Simplify (log 1) into 0
40.832 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
40.832 * [backup-simplify]: Simplify (* 1/3 (- (* 4 (log d)))) into (* -4/3 (log d))
40.833 * [backup-simplify]: Simplify (exp (* -4/3 (log d))) into (pow d -4/3)
40.833 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.833 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.833 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
40.833 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
40.833 * [backup-simplify]: Simplify (* (pow (/ 1 (pow l 7)) 1/6) (pow d -4/3)) into (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))
40.834 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))
40.834 * [backup-simplify]: Simplify (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))) into (* (pow (/ 1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))
40.835 * [backup-simplify]: Simplify (* 1/8 (* (pow (/ 1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) into (* 1/8 (* (pow (/ 1 (pow l 7)) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))))
40.835 * [taylor]: Taking taylor expansion of (* 1/8 (* (pow (/ 1 (pow l 7)) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))) in l
40.835 * [taylor]: Taking taylor expansion of 1/8 in l
40.835 * [backup-simplify]: Simplify 1/8 into 1/8
40.835 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))) in l
40.835 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in l
40.835 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in l
40.835 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in l
40.835 * [taylor]: Taking taylor expansion of 1/6 in l
40.835 * [backup-simplify]: Simplify 1/6 into 1/6
40.835 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in l
40.835 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in l
40.835 * [taylor]: Taking taylor expansion of (pow l 7) in l
40.836 * [taylor]: Taking taylor expansion of l in l
40.836 * [backup-simplify]: Simplify 0 into 0
40.836 * [backup-simplify]: Simplify 1 into 1
40.836 * [backup-simplify]: Simplify (* 1 1) into 1
40.836 * [backup-simplify]: Simplify (* 1 1) into 1
40.837 * [backup-simplify]: Simplify (* 1 1) into 1
40.837 * [backup-simplify]: Simplify (* 1 1) into 1
40.838 * [backup-simplify]: Simplify (/ 1 1) into 1
40.838 * [backup-simplify]: Simplify (log 1) into 0
40.839 * [backup-simplify]: Simplify (+ (* (- 7) (log l)) 0) into (- (* 7 (log l)))
40.839 * [backup-simplify]: Simplify (* 1/6 (- (* 7 (log l)))) into (* -7/6 (log l))
40.839 * [backup-simplify]: Simplify (exp (* -7/6 (log l))) into (pow l -7/6)
40.839 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))) in l
40.839 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in l
40.839 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in l
40.839 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.839 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in l
40.839 * [taylor]: Taking taylor expansion of (pow M 2) in l
40.839 * [taylor]: Taking taylor expansion of M in l
40.839 * [backup-simplify]: Simplify M into M
40.839 * [taylor]: Taking taylor expansion of (pow D 2) in l
40.839 * [taylor]: Taking taylor expansion of D in l
40.839 * [backup-simplify]: Simplify D into D
40.839 * [taylor]: Taking taylor expansion of (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)) in l
40.839 * [taylor]: Taking taylor expansion of (sqrt h) in l
40.839 * [taylor]: Taking taylor expansion of h in l
40.839 * [backup-simplify]: Simplify h into h
40.839 * [backup-simplify]: Simplify (sqrt h) into (sqrt h)
40.839 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt h))) into 0
40.839 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in l
40.839 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in l
40.839 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in l
40.839 * [taylor]: Taking taylor expansion of 1/3 in l
40.840 * [backup-simplify]: Simplify 1/3 into 1/3
40.840 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in l
40.840 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in l
40.840 * [taylor]: Taking taylor expansion of (pow d 4) in l
40.840 * [taylor]: Taking taylor expansion of d in l
40.840 * [backup-simplify]: Simplify d into d
40.840 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.840 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.840 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
40.840 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
40.840 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
40.840 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
40.840 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.840 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.840 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
40.841 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
40.841 * [backup-simplify]: Simplify (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)) into (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))
40.841 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))
40.842 * [backup-simplify]: Simplify (* (pow l -7/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))) into (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))
40.843 * [backup-simplify]: Simplify (* 1/8 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))) into (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
40.843 * [taylor]: Taking taylor expansion of (* 1/8 (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in h
40.843 * [taylor]: Taking taylor expansion of 1/8 in h
40.843 * [backup-simplify]: Simplify 1/8 into 1/8
40.843 * [taylor]: Taking taylor expansion of (* (sqrt h) (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in h
40.843 * [taylor]: Taking taylor expansion of (sqrt h) in h
40.843 * [taylor]: Taking taylor expansion of h in h
40.843 * [backup-simplify]: Simplify 0 into 0
40.843 * [backup-simplify]: Simplify 1 into 1
40.843 * [backup-simplify]: Simplify (sqrt 0) into 0
40.844 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
40.844 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in h
40.844 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in h
40.844 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in h
40.845 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.845 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in h
40.845 * [taylor]: Taking taylor expansion of (pow M 2) in h
40.845 * [taylor]: Taking taylor expansion of M in h
40.845 * [backup-simplify]: Simplify M into M
40.845 * [taylor]: Taking taylor expansion of (pow D 2) in h
40.845 * [taylor]: Taking taylor expansion of D in h
40.845 * [backup-simplify]: Simplify D into D
40.845 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in h
40.845 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in h
40.845 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in h
40.845 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in h
40.845 * [taylor]: Taking taylor expansion of 1/6 in h
40.845 * [backup-simplify]: Simplify 1/6 into 1/6
40.845 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in h
40.845 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in h
40.845 * [taylor]: Taking taylor expansion of (pow l 7) in h
40.845 * [taylor]: Taking taylor expansion of l in h
40.845 * [backup-simplify]: Simplify l into l
40.845 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.845 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.845 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.845 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.845 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
40.845 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
40.845 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
40.845 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
40.845 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in h
40.845 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in h
40.845 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in h
40.845 * [taylor]: Taking taylor expansion of 1/3 in h
40.845 * [backup-simplify]: Simplify 1/3 into 1/3
40.845 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in h
40.845 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in h
40.845 * [taylor]: Taking taylor expansion of (pow d 4) in h
40.845 * [taylor]: Taking taylor expansion of d in h
40.845 * [backup-simplify]: Simplify d into d
40.846 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.846 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.846 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
40.846 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
40.846 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
40.846 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
40.846 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.846 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.846 * [backup-simplify]: Simplify (* (pow M 2) (pow D 2)) into (* (pow M 2) (pow D 2))
40.846 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) into (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))
40.846 * [backup-simplify]: Simplify (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) into (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))
40.846 * [backup-simplify]: Simplify (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))
40.847 * [backup-simplify]: Simplify (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))) into 0
40.847 * [backup-simplify]: Simplify (* 1/8 0) into 0
40.847 * [taylor]: Taking taylor expansion of 0 in M
40.847 * [backup-simplify]: Simplify 0 into 0
40.847 * [taylor]: Taking taylor expansion of 0 in D
40.847 * [backup-simplify]: Simplify 0 into 0
40.847 * [backup-simplify]: Simplify 0 into 0
40.848 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.848 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.849 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
40.849 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
40.850 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
40.850 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (- (* 4 (log d))))) into 0
40.851 * [backup-simplify]: Simplify (* (exp (* -4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
40.851 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
40.851 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
40.851 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
40.851 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
40.851 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow l 7)) (/ 0 (pow l 7))))) into 0
40.852 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow l 7)) 1)))) 1) into 0
40.852 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (/ 1 (pow l 7))))) into 0
40.853 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 (pow l 7))))) (+ (* (/ (pow 0 1) 1)))) into 0
40.853 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow l 7)) 1/6) 0) (* 0 (pow d -4/3))) into 0
40.853 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.853 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.853 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
40.853 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (* 0 (* (pow M 2) (pow D 2)))) into 0
40.854 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into 0
40.854 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))) into 0
40.855 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))))) into 0
40.855 * [taylor]: Taking taylor expansion of 0 in l
40.855 * [backup-simplify]: Simplify 0 into 0
40.855 * [taylor]: Taking taylor expansion of 0 in h
40.855 * [backup-simplify]: Simplify 0 into 0
40.855 * [taylor]: Taking taylor expansion of 0 in M
40.855 * [backup-simplify]: Simplify 0 into 0
40.855 * [taylor]: Taking taylor expansion of 0 in D
40.855 * [backup-simplify]: Simplify 0 into 0
40.855 * [backup-simplify]: Simplify 0 into 0
40.855 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.855 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.855 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))))) into 0
40.856 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 1) into 0
40.856 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (/ 1 (pow d 4))))) into 0
40.857 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 1) 1)))) into 0
40.857 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (* 0 (pow (/ 1 (pow d 4)) 1/3))) into 0
40.857 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.857 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.857 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
40.857 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (* 0 (* (pow M 2) (pow D 2)))) into 0
40.857 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3)))) into 0
40.858 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.858 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.858 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.859 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.859 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
40.860 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
40.860 * [backup-simplify]: Simplify (+ (* (- 7) (log l)) 0) into (- (* 7 (log l)))
40.861 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (- (* 7 (log l))))) into 0
40.861 * [backup-simplify]: Simplify (* (exp (* -7/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.861 * [backup-simplify]: Simplify (+ (* (pow l -7/6) 0) (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))) into 0
40.862 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))) into 0
40.862 * [taylor]: Taking taylor expansion of 0 in h
40.862 * [backup-simplify]: Simplify 0 into 0
40.862 * [taylor]: Taking taylor expansion of 0 in M
40.862 * [backup-simplify]: Simplify 0 into 0
40.862 * [taylor]: Taking taylor expansion of 0 in D
40.862 * [backup-simplify]: Simplify 0 into 0
40.862 * [backup-simplify]: Simplify 0 into 0
40.862 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.862 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.862 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))))) into 0
40.863 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 1) into 0
40.863 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (/ 1 (pow d 4))))) into 0
40.864 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 1) 1)))) into 0
40.864 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
40.864 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
40.864 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
40.864 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
40.864 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow l 7)) (/ 0 (pow l 7))))) into 0
40.865 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (/ 1 (pow l 7)) 1)))) 1) into 0
40.865 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (/ 1 (pow l 7))))) into 0
40.866 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 (pow l 7))))) (+ (* (/ (pow 0 1) 1)))) into 0
40.866 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow l 7)) 1/6) 0) (* 0 (pow (/ 1 (pow d 4)) 1/3))) into 0
40.866 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.866 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.866 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (* 0 (pow D 2))) into 0
40.866 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (* 0 (* (pow M 2) (pow D 2)))) into 0
40.867 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into 0
40.867 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))) into (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))
40.868 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))) (* 0 0)) into (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
40.868 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) in M
40.868 * [taylor]: Taking taylor expansion of (* +nan.0 (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) in M
40.868 * [taylor]: Taking taylor expansion of +nan.0 in M
40.868 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.868 * [taylor]: Taking taylor expansion of (* (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) in M
40.868 * [taylor]: Taking taylor expansion of (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) in M
40.868 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in M
40.868 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.868 * [taylor]: Taking taylor expansion of (* (pow M 2) (pow D 2)) in M
40.868 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.868 * [taylor]: Taking taylor expansion of M in M
40.868 * [backup-simplify]: Simplify 0 into 0
40.868 * [backup-simplify]: Simplify 1 into 1
40.869 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.869 * [taylor]: Taking taylor expansion of D in M
40.869 * [backup-simplify]: Simplify D into D
40.869 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) in M
40.869 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in M
40.869 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in M
40.869 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in M
40.869 * [taylor]: Taking taylor expansion of 1/6 in M
40.869 * [backup-simplify]: Simplify 1/6 into 1/6
40.869 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in M
40.869 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in M
40.869 * [taylor]: Taking taylor expansion of (pow l 7) in M
40.869 * [taylor]: Taking taylor expansion of l in M
40.869 * [backup-simplify]: Simplify l into l
40.869 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.869 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.869 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.869 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.869 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
40.869 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
40.869 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
40.869 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
40.869 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in M
40.869 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in M
40.869 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in M
40.869 * [taylor]: Taking taylor expansion of 1/3 in M
40.869 * [backup-simplify]: Simplify 1/3 into 1/3
40.869 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in M
40.869 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in M
40.869 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.869 * [taylor]: Taking taylor expansion of d in M
40.869 * [backup-simplify]: Simplify d into d
40.869 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.869 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.869 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
40.870 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
40.870 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
40.870 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
40.870 * [backup-simplify]: Simplify (* 1 1) into 1
40.870 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.870 * [backup-simplify]: Simplify (* 1 (pow D 2)) into (pow D 2)
40.870 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (pow D 2)) into (* (pow D 2) (fabs (pow (/ d l) 1/3)))
40.870 * [backup-simplify]: Simplify (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)) into (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))
40.871 * [backup-simplify]: Simplify (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))) into (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)))
40.871 * [backup-simplify]: Simplify (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)))) into (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6))))
40.871 * [backup-simplify]: Simplify (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6))))) into (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)))))
40.871 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6))))) in D
40.871 * [taylor]: Taking taylor expansion of (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)))) in D
40.871 * [taylor]: Taking taylor expansion of +nan.0 in D
40.871 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.871 * [taylor]: Taking taylor expansion of (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6))) in D
40.871 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow d 4)) 1/3) in D
40.871 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (/ 1 (pow d 4))))) in D
40.872 * [taylor]: Taking taylor expansion of (* 1/3 (log (/ 1 (pow d 4)))) in D
40.872 * [taylor]: Taking taylor expansion of 1/3 in D
40.872 * [backup-simplify]: Simplify 1/3 into 1/3
40.872 * [taylor]: Taking taylor expansion of (log (/ 1 (pow d 4))) in D
40.872 * [taylor]: Taking taylor expansion of (/ 1 (pow d 4)) in D
40.872 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.872 * [taylor]: Taking taylor expansion of d in D
40.872 * [backup-simplify]: Simplify d into d
40.872 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.872 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.872 * [backup-simplify]: Simplify (/ 1 (pow d 4)) into (/ 1 (pow d 4))
40.872 * [backup-simplify]: Simplify (log (/ 1 (pow d 4))) into (log (/ 1 (pow d 4)))
40.872 * [backup-simplify]: Simplify (* 1/3 (log (/ 1 (pow d 4)))) into (* 1/3 (log (/ 1 (pow d 4))))
40.872 * [backup-simplify]: Simplify (exp (* 1/3 (log (/ 1 (pow d 4))))) into (pow (/ 1 (pow d 4)) 1/3)
40.872 * [taylor]: Taking taylor expansion of (* (* (pow D 2) (fabs (pow (/ d l) 1/3))) (pow (/ 1 (pow l 7)) 1/6)) in D
40.872 * [taylor]: Taking taylor expansion of (* (pow D 2) (fabs (pow (/ d l) 1/3))) in D
40.872 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.872 * [taylor]: Taking taylor expansion of D in D
40.872 * [backup-simplify]: Simplify 0 into 0
40.872 * [backup-simplify]: Simplify 1 into 1
40.872 * [taylor]: Taking taylor expansion of (fabs (pow (/ d l) 1/3)) in D
40.872 * [backup-simplify]: Simplify (fabs (pow (/ d l) 1/3)) into (fabs (pow (/ d l) 1/3))
40.872 * [taylor]: Taking taylor expansion of (pow (/ 1 (pow l 7)) 1/6) in D
40.872 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (/ 1 (pow l 7))))) in D
40.872 * [taylor]: Taking taylor expansion of (* 1/6 (log (/ 1 (pow l 7)))) in D
40.872 * [taylor]: Taking taylor expansion of 1/6 in D
40.872 * [backup-simplify]: Simplify 1/6 into 1/6
40.872 * [taylor]: Taking taylor expansion of (log (/ 1 (pow l 7))) in D
40.872 * [taylor]: Taking taylor expansion of (/ 1 (pow l 7)) in D
40.872 * [taylor]: Taking taylor expansion of (pow l 7) in D
40.872 * [taylor]: Taking taylor expansion of l in D
40.872 * [backup-simplify]: Simplify l into l
40.872 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.872 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.872 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.873 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.873 * [backup-simplify]: Simplify (/ 1 (pow l 7)) into (/ 1 (pow l 7))
40.873 * [backup-simplify]: Simplify (log (/ 1 (pow l 7))) into (log (/ 1 (pow l 7)))
40.873 * [backup-simplify]: Simplify (* 1/6 (log (/ 1 (pow l 7)))) into (* 1/6 (log (/ 1 (pow l 7))))
40.873 * [backup-simplify]: Simplify (exp (* 1/6 (log (/ 1 (pow l 7))))) into (pow (/ 1 (pow l 7)) 1/6)
40.873 * [backup-simplify]: Simplify (* 1 1) into 1
40.873 * [backup-simplify]: Simplify (* 1 (fabs (pow (/ d l) 1/3))) into (fabs (pow (/ d l) 1/3))
40.873 * [backup-simplify]: Simplify (* (fabs (pow (/ d l) 1/3)) (pow (/ 1 (pow l 7)) 1/6)) into (* (pow (/ 1 (pow l 7)) 1/6) (fabs (pow (/ d l) 1/3)))
40.873 * [backup-simplify]: Simplify (* (pow (/ 1 (pow d 4)) 1/3) (* (pow (/ 1 (pow l 7)) 1/6) (fabs (pow (/ d l) 1/3)))) into (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))
40.874 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) into (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))
40.874 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
40.874 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))))
40.874 * [taylor]: Taking taylor expansion of 0 in D
40.874 * [backup-simplify]: Simplify 0 into 0
40.874 * [backup-simplify]: Simplify 0 into 0
40.874 * [backup-simplify]: Simplify 0 into 0
40.875 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.876 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.876 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
40.878 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
40.878 * [backup-simplify]: Simplify (+ (* (- 4) (log d)) 0) into (- (* 4 (log d)))
40.878 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (- (* 4 (log d)))))) into 0
40.879 * [backup-simplify]: Simplify (* (exp (* -4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.879 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
40.880 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
40.880 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
40.881 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
40.881 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow l 7)) (/ 0 (pow l 7))) (* 0 (/ 0 (pow l 7))))) into 0
40.883 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (/ 1 (pow l 7)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (/ 1 (pow l 7)) 1)))) 2) into 0
40.883 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (/ 1 (pow l 7)))))) into 0
40.884 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (/ 1 (pow l 7))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.885 * [backup-simplify]: Simplify (+ (* (pow (/ 1 (pow l 7)) 1/6) 0) (+ (* 0 0) (* 0 (pow d -4/3)))) into 0
40.885 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.885 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.886 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
40.886 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (+ (* 0 0) (* 0 (* (pow M 2) (pow D 2))))) into 0
40.886 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (+ (* 0 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) into 0
40.887 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt h))) into 0
40.887 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (+ (* 0 0) (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))) into 0
40.888 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (pow (/ 1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h))))))) into 0
40.888 * [taylor]: Taking taylor expansion of 0 in l
40.888 * [backup-simplify]: Simplify 0 into 0
40.888 * [taylor]: Taking taylor expansion of 0 in h
40.888 * [backup-simplify]: Simplify 0 into 0
40.888 * [taylor]: Taking taylor expansion of 0 in M
40.888 * [backup-simplify]: Simplify 0 into 0
40.889 * [taylor]: Taking taylor expansion of 0 in D
40.889 * [backup-simplify]: Simplify 0 into 0
40.889 * [backup-simplify]: Simplify 0 into 0
40.889 * [taylor]: Taking taylor expansion of 0 in h
40.889 * [backup-simplify]: Simplify 0 into 0
40.889 * [taylor]: Taking taylor expansion of 0 in M
40.889 * [backup-simplify]: Simplify 0 into 0
40.889 * [taylor]: Taking taylor expansion of 0 in D
40.889 * [backup-simplify]: Simplify 0 into 0
40.889 * [backup-simplify]: Simplify 0 into 0
40.889 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
40.889 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
40.889 * [backup-simplify]: Simplify (- (+ (* (/ 1 (pow d 4)) (/ 0 (pow d 4))) (* 0 (/ 0 (pow d 4))))) into 0
40.890 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (/ 1 (pow d 4)) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (/ 1 (pow d 4)) 1)))) 2) into 0
40.891 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (/ 1 (pow d 4)))))) into 0
40.892 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (/ 1 (pow d 4))))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.892 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt h))) into 0
40.893 * [backup-simplify]: Simplify (+ (* (sqrt h) 0) (+ (* 0 0) (* 0 (pow (/ 1 (pow d 4)) 1/3)))) into 0
40.893 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.893 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.893 * [backup-simplify]: Simplify (+ (* (pow M 2) 0) (+ (* 0 0) (* 0 (pow D 2)))) into 0
40.894 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ d l) 1/3)) 0) (+ (* 0 0) (* 0 (* (pow M 2) (pow D 2))))) into 0
40.894 * [backup-simplify]: Simplify (+ (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) 0) (+ (* 0 0) (* 0 (* (sqrt h) (pow (/ 1 (pow d 4)) 1/3))))) into 0
40.895 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.895 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.896 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.896 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.897 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
40.898 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
40.899 * [backup-simplify]: Simplify (+ (* (- 7) (log l)) 0) into (- (* 7 (log l)))
40.899 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (- (* 7 (log l)))))) into 0
40.900 * [backup-simplify]: Simplify (* (exp (* -7/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.901 * [backup-simplify]: Simplify (+ (* (pow l -7/6) 0) (+ (* 0 0) (* 0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (sqrt h)))))) into 0
40.902 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (sqrt h) (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6))))))) into 0
40.902 * [taylor]: Taking taylor expansion of 0 in h
40.902 * [backup-simplify]: Simplify 0 into 0
40.902 * [taylor]: Taking taylor expansion of 0 in M
40.902 * [backup-simplify]: Simplify 0 into 0
40.902 * [taylor]: Taking taylor expansion of 0 in D
40.902 * [backup-simplify]: Simplify 0 into 0
40.902 * [backup-simplify]: Simplify 0 into 0
40.902 * [taylor]: Taking taylor expansion of 0 in M
40.902 * [backup-simplify]: Simplify 0 into 0
40.902 * [taylor]: Taking taylor expansion of 0 in D
40.902 * [backup-simplify]: Simplify 0 into 0
40.902 * [backup-simplify]: Simplify 0 into 0
40.902 * [backup-simplify]: Simplify (* (- (* +nan.0 (* (fabs (pow (/ d l) 1/3)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3))))) (* (pow D 2) (* (pow M 2) (* h (* 1 1))))) into (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 (pow l 7)) 1/6))))
40.903 * [backup-simplify]: Simplify (/ (* (* (* (fabs (/ (cbrt (/ 1 d)) (cbrt (/ 1 l)))) (sqrt (/ (cbrt (/ 1 d)) (cbrt (/ 1 l))))) (sqrt (/ (/ 1 d) (/ 1 h)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (* (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) (/ 1 h)))) (* (/ 1 l) 2)) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
40.903 * [approximate]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in (d l h M D) around 0
40.903 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
40.903 * [taylor]: Taking taylor expansion of 1/8 in D
40.903 * [backup-simplify]: Simplify 1/8 into 1/8
40.903 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
40.903 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in D
40.903 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.903 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.903 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in D
40.903 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.903 * [taylor]: Taking taylor expansion of D in D
40.903 * [backup-simplify]: Simplify 0 into 0
40.903 * [backup-simplify]: Simplify 1 into 1
40.903 * [taylor]: Taking taylor expansion of (pow M 2) in D
40.903 * [taylor]: Taking taylor expansion of M in D
40.903 * [backup-simplify]: Simplify M into M
40.904 * [backup-simplify]: Simplify (* 1 1) into 1
40.904 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.904 * [backup-simplify]: Simplify (* 1 (pow M 2)) into (pow M 2)
40.904 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow M 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow M 2))
40.904 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
40.904 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in D
40.904 * [taylor]: Taking taylor expansion of (/ 1 h) in D
40.904 * [taylor]: Taking taylor expansion of h in D
40.904 * [backup-simplify]: Simplify h into h
40.904 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.904 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.904 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.904 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.904 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
40.904 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
40.904 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
40.904 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
40.904 * [taylor]: Taking taylor expansion of 1/6 in D
40.904 * [backup-simplify]: Simplify 1/6 into 1/6
40.904 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
40.904 * [taylor]: Taking taylor expansion of (pow l 7) in D
40.904 * [taylor]: Taking taylor expansion of l in D
40.904 * [backup-simplify]: Simplify l into l
40.904 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.904 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.904 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.904 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.905 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
40.905 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
40.905 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
40.905 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.905 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.905 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.905 * [taylor]: Taking taylor expansion of 1/3 in D
40.905 * [backup-simplify]: Simplify 1/3 into 1/3
40.905 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.905 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.905 * [taylor]: Taking taylor expansion of d in D
40.905 * [backup-simplify]: Simplify d into d
40.905 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.905 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.905 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.905 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.905 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.905 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
40.905 * [taylor]: Taking taylor expansion of 1/8 in M
40.905 * [backup-simplify]: Simplify 1/8 into 1/8
40.905 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
40.905 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.905 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.905 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.905 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.905 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.905 * [taylor]: Taking taylor expansion of D in M
40.905 * [backup-simplify]: Simplify D into D
40.905 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.905 * [taylor]: Taking taylor expansion of M in M
40.905 * [backup-simplify]: Simplify 0 into 0
40.905 * [backup-simplify]: Simplify 1 into 1
40.905 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.906 * [backup-simplify]: Simplify (* 1 1) into 1
40.906 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.906 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.906 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
40.906 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in M
40.906 * [taylor]: Taking taylor expansion of (/ 1 h) in M
40.906 * [taylor]: Taking taylor expansion of h in M
40.906 * [backup-simplify]: Simplify h into h
40.906 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.906 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.906 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.906 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.906 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
40.906 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
40.906 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
40.906 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
40.906 * [taylor]: Taking taylor expansion of 1/6 in M
40.906 * [backup-simplify]: Simplify 1/6 into 1/6
40.906 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
40.906 * [taylor]: Taking taylor expansion of (pow l 7) in M
40.906 * [taylor]: Taking taylor expansion of l in M
40.906 * [backup-simplify]: Simplify l into l
40.906 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.906 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.906 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.906 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.906 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
40.907 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
40.907 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
40.907 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.907 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.907 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.907 * [taylor]: Taking taylor expansion of 1/3 in M
40.907 * [backup-simplify]: Simplify 1/3 into 1/3
40.907 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.907 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.907 * [taylor]: Taking taylor expansion of d in M
40.907 * [backup-simplify]: Simplify d into d
40.907 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.907 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.907 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.907 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.907 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.907 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in h
40.907 * [taylor]: Taking taylor expansion of 1/8 in h
40.907 * [backup-simplify]: Simplify 1/8 into 1/8
40.907 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in h
40.907 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
40.907 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
40.907 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.907 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
40.907 * [taylor]: Taking taylor expansion of (pow D 2) in h
40.907 * [taylor]: Taking taylor expansion of D in h
40.907 * [backup-simplify]: Simplify D into D
40.907 * [taylor]: Taking taylor expansion of (pow M 2) in h
40.907 * [taylor]: Taking taylor expansion of M in h
40.907 * [backup-simplify]: Simplify M into M
40.907 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.907 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.907 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.907 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.908 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in h
40.908 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
40.908 * [taylor]: Taking taylor expansion of (/ 1 h) in h
40.908 * [taylor]: Taking taylor expansion of h in h
40.908 * [backup-simplify]: Simplify 0 into 0
40.908 * [backup-simplify]: Simplify 1 into 1
40.908 * [backup-simplify]: Simplify (/ 1 1) into 1
40.908 * [backup-simplify]: Simplify (sqrt 0) into 0
40.909 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
40.909 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in h
40.909 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in h
40.909 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in h
40.909 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in h
40.909 * [taylor]: Taking taylor expansion of 1/6 in h
40.909 * [backup-simplify]: Simplify 1/6 into 1/6
40.909 * [taylor]: Taking taylor expansion of (log (pow l 7)) in h
40.909 * [taylor]: Taking taylor expansion of (pow l 7) in h
40.909 * [taylor]: Taking taylor expansion of l in h
40.909 * [backup-simplify]: Simplify l into l
40.909 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.909 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.909 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.909 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.909 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
40.909 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
40.910 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
40.910 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
40.910 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
40.910 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
40.910 * [taylor]: Taking taylor expansion of 1/3 in h
40.910 * [backup-simplify]: Simplify 1/3 into 1/3
40.910 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
40.910 * [taylor]: Taking taylor expansion of (pow d 4) in h
40.910 * [taylor]: Taking taylor expansion of d in h
40.910 * [backup-simplify]: Simplify d into d
40.910 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.910 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.910 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.910 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.910 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.910 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in l
40.910 * [taylor]: Taking taylor expansion of 1/8 in l
40.910 * [backup-simplify]: Simplify 1/8 into 1/8
40.910 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in l
40.910 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
40.910 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
40.910 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.910 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
40.910 * [taylor]: Taking taylor expansion of (pow D 2) in l
40.910 * [taylor]: Taking taylor expansion of D in l
40.910 * [backup-simplify]: Simplify D into D
40.910 * [taylor]: Taking taylor expansion of (pow M 2) in l
40.910 * [taylor]: Taking taylor expansion of M in l
40.910 * [backup-simplify]: Simplify M into M
40.910 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.910 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.910 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.910 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.911 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in l
40.911 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
40.911 * [taylor]: Taking taylor expansion of (/ 1 h) in l
40.911 * [taylor]: Taking taylor expansion of h in l
40.911 * [backup-simplify]: Simplify h into h
40.911 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.911 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.911 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.911 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.911 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in l
40.911 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in l
40.911 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in l
40.911 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in l
40.911 * [taylor]: Taking taylor expansion of 1/6 in l
40.911 * [backup-simplify]: Simplify 1/6 into 1/6
40.911 * [taylor]: Taking taylor expansion of (log (pow l 7)) in l
40.911 * [taylor]: Taking taylor expansion of (pow l 7) in l
40.911 * [taylor]: Taking taylor expansion of l in l
40.911 * [backup-simplify]: Simplify 0 into 0
40.911 * [backup-simplify]: Simplify 1 into 1
40.911 * [backup-simplify]: Simplify (* 1 1) into 1
40.911 * [backup-simplify]: Simplify (* 1 1) into 1
40.912 * [backup-simplify]: Simplify (* 1 1) into 1
40.912 * [backup-simplify]: Simplify (* 1 1) into 1
40.912 * [backup-simplify]: Simplify (log 1) into 0
40.912 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
40.912 * [backup-simplify]: Simplify (* 1/6 (* 7 (log l))) into (* 7/6 (log l))
40.913 * [backup-simplify]: Simplify (exp (* 7/6 (log l))) into (pow l 7/6)
40.913 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
40.913 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
40.913 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
40.913 * [taylor]: Taking taylor expansion of 1/3 in l
40.913 * [backup-simplify]: Simplify 1/3 into 1/3
40.913 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
40.913 * [taylor]: Taking taylor expansion of (pow d 4) in l
40.913 * [taylor]: Taking taylor expansion of d in l
40.913 * [backup-simplify]: Simplify d into d
40.913 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.913 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.913 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.913 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.913 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.913 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in d
40.913 * [taylor]: Taking taylor expansion of 1/8 in d
40.913 * [backup-simplify]: Simplify 1/8 into 1/8
40.913 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in d
40.913 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
40.913 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
40.913 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.913 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
40.913 * [taylor]: Taking taylor expansion of (pow D 2) in d
40.913 * [taylor]: Taking taylor expansion of D in d
40.913 * [backup-simplify]: Simplify D into D
40.913 * [taylor]: Taking taylor expansion of (pow M 2) in d
40.913 * [taylor]: Taking taylor expansion of M in d
40.913 * [backup-simplify]: Simplify M into M
40.913 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.913 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.913 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.913 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.914 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in d
40.914 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
40.914 * [taylor]: Taking taylor expansion of (/ 1 h) in d
40.914 * [taylor]: Taking taylor expansion of h in d
40.914 * [backup-simplify]: Simplify h into h
40.914 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.914 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.914 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.914 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.914 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in d
40.914 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in d
40.914 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in d
40.914 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in d
40.914 * [taylor]: Taking taylor expansion of 1/6 in d
40.914 * [backup-simplify]: Simplify 1/6 into 1/6
40.914 * [taylor]: Taking taylor expansion of (log (pow l 7)) in d
40.914 * [taylor]: Taking taylor expansion of (pow l 7) in d
40.914 * [taylor]: Taking taylor expansion of l in d
40.914 * [backup-simplify]: Simplify l into l
40.914 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.914 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.914 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.914 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.914 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
40.914 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
40.914 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
40.914 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
40.914 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
40.914 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
40.914 * [taylor]: Taking taylor expansion of 1/3 in d
40.914 * [backup-simplify]: Simplify 1/3 into 1/3
40.914 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
40.914 * [taylor]: Taking taylor expansion of (pow d 4) in d
40.914 * [taylor]: Taking taylor expansion of d in d
40.914 * [backup-simplify]: Simplify 0 into 0
40.914 * [backup-simplify]: Simplify 1 into 1
40.915 * [backup-simplify]: Simplify (* 1 1) into 1
40.915 * [backup-simplify]: Simplify (* 1 1) into 1
40.915 * [backup-simplify]: Simplify (log 1) into 0
40.915 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.915 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
40.916 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
40.916 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in d
40.916 * [taylor]: Taking taylor expansion of 1/8 in d
40.916 * [backup-simplify]: Simplify 1/8 into 1/8
40.916 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in d
40.916 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
40.916 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
40.916 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.916 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
40.916 * [taylor]: Taking taylor expansion of (pow D 2) in d
40.916 * [taylor]: Taking taylor expansion of D in d
40.916 * [backup-simplify]: Simplify D into D
40.916 * [taylor]: Taking taylor expansion of (pow M 2) in d
40.916 * [taylor]: Taking taylor expansion of M in d
40.916 * [backup-simplify]: Simplify M into M
40.916 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.916 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.916 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.916 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.916 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in d
40.916 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
40.916 * [taylor]: Taking taylor expansion of (/ 1 h) in d
40.916 * [taylor]: Taking taylor expansion of h in d
40.916 * [backup-simplify]: Simplify h into h
40.916 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.916 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.916 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.916 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.916 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in d
40.916 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in d
40.916 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in d
40.916 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in d
40.916 * [taylor]: Taking taylor expansion of 1/6 in d
40.916 * [backup-simplify]: Simplify 1/6 into 1/6
40.916 * [taylor]: Taking taylor expansion of (log (pow l 7)) in d
40.917 * [taylor]: Taking taylor expansion of (pow l 7) in d
40.917 * [taylor]: Taking taylor expansion of l in d
40.917 * [backup-simplify]: Simplify l into l
40.917 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.917 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.917 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.917 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.917 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
40.917 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
40.917 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
40.917 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
40.917 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
40.917 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
40.917 * [taylor]: Taking taylor expansion of 1/3 in d
40.917 * [backup-simplify]: Simplify 1/3 into 1/3
40.917 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
40.917 * [taylor]: Taking taylor expansion of (pow d 4) in d
40.917 * [taylor]: Taking taylor expansion of d in d
40.917 * [backup-simplify]: Simplify 0 into 0
40.917 * [backup-simplify]: Simplify 1 into 1
40.917 * [backup-simplify]: Simplify (* 1 1) into 1
40.918 * [backup-simplify]: Simplify (* 1 1) into 1
40.918 * [backup-simplify]: Simplify (log 1) into 0
40.918 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.918 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
40.918 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
40.918 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow d 4/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
40.918 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))
40.919 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))
40.919 * [backup-simplify]: Simplify (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
40.919 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in l
40.919 * [taylor]: Taking taylor expansion of 1/8 in l
40.919 * [backup-simplify]: Simplify 1/8 into 1/8
40.919 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in l
40.919 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
40.919 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
40.919 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.919 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
40.919 * [taylor]: Taking taylor expansion of (pow D 2) in l
40.919 * [taylor]: Taking taylor expansion of D in l
40.919 * [backup-simplify]: Simplify D into D
40.919 * [taylor]: Taking taylor expansion of (pow M 2) in l
40.919 * [taylor]: Taking taylor expansion of M in l
40.919 * [backup-simplify]: Simplify M into M
40.919 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.919 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.919 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.920 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.920 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in l
40.920 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
40.920 * [taylor]: Taking taylor expansion of (/ 1 h) in l
40.920 * [taylor]: Taking taylor expansion of h in l
40.920 * [backup-simplify]: Simplify h into h
40.920 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
40.920 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
40.920 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
40.920 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
40.920 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in l
40.920 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in l
40.920 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in l
40.920 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in l
40.920 * [taylor]: Taking taylor expansion of 1/6 in l
40.920 * [backup-simplify]: Simplify 1/6 into 1/6
40.920 * [taylor]: Taking taylor expansion of (log (pow l 7)) in l
40.920 * [taylor]: Taking taylor expansion of (pow l 7) in l
40.920 * [taylor]: Taking taylor expansion of l in l
40.920 * [backup-simplify]: Simplify 0 into 0
40.920 * [backup-simplify]: Simplify 1 into 1
40.921 * [backup-simplify]: Simplify (* 1 1) into 1
40.921 * [backup-simplify]: Simplify (* 1 1) into 1
40.922 * [backup-simplify]: Simplify (* 1 1) into 1
40.922 * [backup-simplify]: Simplify (* 1 1) into 1
40.923 * [backup-simplify]: Simplify (log 1) into 0
40.925 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
40.925 * [backup-simplify]: Simplify (* 1/6 (* 7 (log l))) into (* 7/6 (log l))
40.925 * [backup-simplify]: Simplify (exp (* 7/6 (log l))) into (pow l 7/6)
40.925 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
40.925 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
40.925 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
40.925 * [taylor]: Taking taylor expansion of 1/3 in l
40.925 * [backup-simplify]: Simplify 1/3 into 1/3
40.925 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
40.925 * [taylor]: Taking taylor expansion of (pow d 4) in l
40.926 * [taylor]: Taking taylor expansion of d in l
40.926 * [backup-simplify]: Simplify d into d
40.926 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.926 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.926 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.926 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.926 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.926 * [backup-simplify]: Simplify (* (pow l 7/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
40.926 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))
40.927 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))
40.928 * [backup-simplify]: Simplify (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
40.928 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in h
40.928 * [taylor]: Taking taylor expansion of 1/8 in h
40.928 * [backup-simplify]: Simplify 1/8 into 1/8
40.928 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in h
40.928 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
40.928 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
40.928 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.928 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
40.928 * [taylor]: Taking taylor expansion of (pow D 2) in h
40.928 * [taylor]: Taking taylor expansion of D in h
40.928 * [backup-simplify]: Simplify D into D
40.928 * [taylor]: Taking taylor expansion of (pow M 2) in h
40.928 * [taylor]: Taking taylor expansion of M in h
40.928 * [backup-simplify]: Simplify M into M
40.928 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.928 * [backup-simplify]: Simplify (* M M) into (pow M 2)
40.928 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
40.929 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
40.929 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in h
40.929 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
40.929 * [taylor]: Taking taylor expansion of (/ 1 h) in h
40.929 * [taylor]: Taking taylor expansion of h in h
40.929 * [backup-simplify]: Simplify 0 into 0
40.929 * [backup-simplify]: Simplify 1 into 1
40.929 * [backup-simplify]: Simplify (/ 1 1) into 1
40.930 * [backup-simplify]: Simplify (sqrt 0) into 0
40.931 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
40.931 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in h
40.931 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in h
40.931 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in h
40.931 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in h
40.931 * [taylor]: Taking taylor expansion of 1/6 in h
40.931 * [backup-simplify]: Simplify 1/6 into 1/6
40.931 * [taylor]: Taking taylor expansion of (log (pow l 7)) in h
40.931 * [taylor]: Taking taylor expansion of (pow l 7) in h
40.931 * [taylor]: Taking taylor expansion of l in h
40.931 * [backup-simplify]: Simplify l into l
40.932 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.932 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.932 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.932 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.932 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
40.932 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
40.932 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
40.932 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
40.932 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
40.932 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
40.932 * [taylor]: Taking taylor expansion of 1/3 in h
40.932 * [backup-simplify]: Simplify 1/3 into 1/3
40.932 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
40.932 * [taylor]: Taking taylor expansion of (pow d 4) in h
40.932 * [taylor]: Taking taylor expansion of d in h
40.932 * [backup-simplify]: Simplify d into d
40.932 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.933 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.933 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.933 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.933 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.933 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
40.933 * [backup-simplify]: Simplify (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into 0
40.933 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) into 0
40.934 * [backup-simplify]: Simplify (* 1/8 0) into 0
40.934 * [taylor]: Taking taylor expansion of 0 in M
40.934 * [backup-simplify]: Simplify 0 into 0
40.935 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.935 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.937 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
40.937 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.938 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (* 4 (log d)))) into 0
40.939 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
40.939 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
40.939 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
40.939 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
40.939 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
40.940 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
40.941 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
40.941 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.942 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow d 4/3))) into 0
40.942 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
40.942 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.942 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.942 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.943 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.943 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
40.944 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
40.944 * [taylor]: Taking taylor expansion of 0 in l
40.944 * [backup-simplify]: Simplify 0 into 0
40.944 * [taylor]: Taking taylor expansion of 0 in h
40.945 * [backup-simplify]: Simplify 0 into 0
40.945 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.945 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.946 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.946 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.947 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.948 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.948 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.949 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.950 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
40.951 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
40.952 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
40.952 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (* 7 (log l)))) into 0
40.953 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
40.953 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
40.954 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
40.954 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.954 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.954 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.954 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.955 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
40.956 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
40.956 * [taylor]: Taking taylor expansion of 0 in h
40.956 * [backup-simplify]: Simplify 0 into 0
40.956 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
40.956 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
40.957 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
40.958 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
40.959 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.959 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
40.959 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
40.959 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
40.959 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
40.960 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
40.960 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
40.961 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
40.961 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
40.962 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
40.962 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
40.962 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
40.962 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
40.963 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.964 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
40.966 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
40.966 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
40.966 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
40.966 * [taylor]: Taking taylor expansion of +nan.0 in M
40.966 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.966 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
40.966 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
40.966 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
40.966 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.966 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
40.966 * [taylor]: Taking taylor expansion of (pow D 2) in M
40.966 * [taylor]: Taking taylor expansion of D in M
40.966 * [backup-simplify]: Simplify D into D
40.966 * [taylor]: Taking taylor expansion of (pow M 2) in M
40.966 * [taylor]: Taking taylor expansion of M in M
40.966 * [backup-simplify]: Simplify 0 into 0
40.966 * [backup-simplify]: Simplify 1 into 1
40.966 * [backup-simplify]: Simplify (* D D) into (pow D 2)
40.967 * [backup-simplify]: Simplify (* 1 1) into 1
40.967 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
40.967 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
40.967 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
40.967 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
40.967 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
40.967 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
40.967 * [taylor]: Taking taylor expansion of 1/6 in M
40.967 * [backup-simplify]: Simplify 1/6 into 1/6
40.967 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
40.967 * [taylor]: Taking taylor expansion of (pow l 7) in M
40.967 * [taylor]: Taking taylor expansion of l in M
40.967 * [backup-simplify]: Simplify l into l
40.967 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.967 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.967 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.968 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.968 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
40.968 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
40.968 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
40.968 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
40.968 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
40.968 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
40.968 * [taylor]: Taking taylor expansion of 1/3 in M
40.968 * [backup-simplify]: Simplify 1/3 into 1/3
40.968 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
40.968 * [taylor]: Taking taylor expansion of (pow d 4) in M
40.968 * [taylor]: Taking taylor expansion of d in M
40.968 * [backup-simplify]: Simplify d into d
40.968 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.968 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.968 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.968 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.968 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.969 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
40.969 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
40.969 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
40.970 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
40.970 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
40.970 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
40.970 * [taylor]: Taking taylor expansion of +nan.0 in D
40.970 * [backup-simplify]: Simplify +nan.0 into +nan.0
40.970 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
40.970 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
40.970 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
40.970 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
40.970 * [taylor]: Taking taylor expansion of (pow D 2) in D
40.971 * [taylor]: Taking taylor expansion of D in D
40.971 * [backup-simplify]: Simplify 0 into 0
40.971 * [backup-simplify]: Simplify 1 into 1
40.971 * [backup-simplify]: Simplify (* 1 1) into 1
40.971 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
40.971 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
40.971 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
40.971 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
40.971 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
40.971 * [taylor]: Taking taylor expansion of 1/6 in D
40.971 * [backup-simplify]: Simplify 1/6 into 1/6
40.971 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
40.971 * [taylor]: Taking taylor expansion of (pow l 7) in D
40.972 * [taylor]: Taking taylor expansion of l in D
40.972 * [backup-simplify]: Simplify l into l
40.972 * [backup-simplify]: Simplify (* l l) into (pow l 2)
40.972 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
40.972 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
40.972 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
40.972 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
40.972 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
40.973 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
40.973 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
40.973 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
40.973 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
40.973 * [taylor]: Taking taylor expansion of 1/3 in D
40.973 * [backup-simplify]: Simplify 1/3 into 1/3
40.973 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
40.973 * [taylor]: Taking taylor expansion of (pow d 4) in D
40.973 * [taylor]: Taking taylor expansion of d in D
40.973 * [backup-simplify]: Simplify d into d
40.973 * [backup-simplify]: Simplify (* d d) into (pow d 2)
40.973 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
40.973 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
40.973 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
40.973 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
40.973 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
40.974 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
40.974 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
40.974 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
40.975 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
40.976 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.977 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
40.980 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
40.981 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
40.982 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (* 4 (log d))))) into 0
40.983 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.984 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
40.984 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
40.985 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
40.985 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
40.987 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow l 7) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow l 7) 1)))) 2) into 0
40.988 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (pow l 7))))) into 0
40.989 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
40.990 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (* 0 (pow d 4/3)))) into 0
40.990 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
40.991 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
40.991 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
40.992 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
40.992 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
40.993 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
40.993 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
40.994 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
40.996 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
40.996 * [taylor]: Taking taylor expansion of 0 in l
40.996 * [backup-simplify]: Simplify 0 into 0
40.996 * [taylor]: Taking taylor expansion of 0 in h
40.996 * [backup-simplify]: Simplify 0 into 0
40.996 * [taylor]: Taking taylor expansion of 0 in h
40.996 * [backup-simplify]: Simplify 0 into 0
40.997 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
40.997 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
40.999 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
40.999 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
41.000 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.001 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.001 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.002 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.002 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.004 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
41.004 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
41.005 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (* 7 (log l))))) into 0
41.006 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.006 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
41.006 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
41.006 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
41.007 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
41.007 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
41.007 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
41.008 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
41.008 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.009 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
41.009 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
41.009 * [taylor]: Taking taylor expansion of 0 in h
41.009 * [backup-simplify]: Simplify 0 into 0
41.009 * [taylor]: Taking taylor expansion of 0 in M
41.009 * [backup-simplify]: Simplify 0 into 0
41.009 * [taylor]: Taking taylor expansion of 0 in M
41.009 * [backup-simplify]: Simplify 0 into 0
41.010 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
41.010 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
41.011 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
41.012 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
41.012 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.013 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
41.013 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
41.013 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
41.014 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
41.015 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow l 7) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow l 7) 1)))) 2) into 0
41.015 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (pow l 7))))) into 0
41.016 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.016 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
41.017 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
41.018 * [backup-simplify]: Simplify (/ (- 0 (pow +nan.0 2) (+)) (* 2 0)) into +nan.0
41.019 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.019 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
41.020 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
41.020 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
41.020 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.021 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.022 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.023 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
41.023 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
41.023 * [taylor]: Taking taylor expansion of +nan.0 in M
41.023 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.023 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
41.023 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
41.023 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
41.023 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.023 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
41.023 * [taylor]: Taking taylor expansion of (pow D 2) in M
41.023 * [taylor]: Taking taylor expansion of D in M
41.023 * [backup-simplify]: Simplify D into D
41.023 * [taylor]: Taking taylor expansion of (pow M 2) in M
41.023 * [taylor]: Taking taylor expansion of M in M
41.023 * [backup-simplify]: Simplify 0 into 0
41.023 * [backup-simplify]: Simplify 1 into 1
41.023 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.023 * [backup-simplify]: Simplify (* 1 1) into 1
41.023 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
41.024 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
41.024 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
41.024 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
41.024 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
41.024 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
41.024 * [taylor]: Taking taylor expansion of 1/6 in M
41.024 * [backup-simplify]: Simplify 1/6 into 1/6
41.024 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
41.024 * [taylor]: Taking taylor expansion of (pow l 7) in M
41.024 * [taylor]: Taking taylor expansion of l in M
41.024 * [backup-simplify]: Simplify l into l
41.024 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.024 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.024 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.024 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.024 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.024 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.024 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.024 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
41.024 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
41.024 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
41.024 * [taylor]: Taking taylor expansion of 1/3 in M
41.024 * [backup-simplify]: Simplify 1/3 into 1/3
41.024 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
41.024 * [taylor]: Taking taylor expansion of (pow d 4) in M
41.024 * [taylor]: Taking taylor expansion of d in M
41.024 * [backup-simplify]: Simplify d into d
41.024 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.024 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.024 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.024 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.025 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.025 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.025 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.025 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.025 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.025 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
41.025 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
41.025 * [taylor]: Taking taylor expansion of +nan.0 in D
41.025 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.025 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
41.025 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
41.025 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
41.026 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.026 * [taylor]: Taking taylor expansion of (pow D 2) in D
41.026 * [taylor]: Taking taylor expansion of D in D
41.026 * [backup-simplify]: Simplify 0 into 0
41.026 * [backup-simplify]: Simplify 1 into 1
41.026 * [backup-simplify]: Simplify (* 1 1) into 1
41.026 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
41.026 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
41.026 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
41.026 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
41.026 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
41.026 * [taylor]: Taking taylor expansion of 1/6 in D
41.026 * [backup-simplify]: Simplify 1/6 into 1/6
41.026 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
41.026 * [taylor]: Taking taylor expansion of (pow l 7) in D
41.026 * [taylor]: Taking taylor expansion of l in D
41.026 * [backup-simplify]: Simplify l into l
41.026 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.026 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.026 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.026 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.026 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.026 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.026 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.027 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
41.027 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
41.027 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
41.027 * [taylor]: Taking taylor expansion of 1/3 in D
41.027 * [backup-simplify]: Simplify 1/3 into 1/3
41.027 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
41.027 * [taylor]: Taking taylor expansion of (pow d 4) in D
41.027 * [taylor]: Taking taylor expansion of d in D
41.027 * [backup-simplify]: Simplify d into d
41.027 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.027 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.027 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.027 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.027 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.027 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.027 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.027 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.028 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.028 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.028 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
41.028 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
41.029 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
41.029 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
41.029 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.029 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
41.030 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
41.030 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
41.030 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
41.030 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
41.030 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
41.031 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.031 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
41.031 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.032 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
41.032 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
41.032 * [backup-simplify]: Simplify (- (/ 0 (pow D 2)) (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (/ 0 (pow D 2))))) into 0
41.032 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
41.033 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
41.033 * [backup-simplify]: Simplify (- 0) into 0
41.033 * [taylor]: Taking taylor expansion of 0 in D
41.033 * [backup-simplify]: Simplify 0 into 0
41.033 * [taylor]: Taking taylor expansion of 0 in D
41.033 * [backup-simplify]: Simplify 0 into 0
41.033 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
41.033 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
41.034 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
41.034 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
41.035 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.035 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
41.035 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
41.035 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
41.035 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
41.035 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
41.036 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
41.036 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.036 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
41.037 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.037 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (fabs (pow (/ l d) 1/3)) (/ 0 1)))) into 0
41.038 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ l d) 1/3)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
41.038 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
41.038 * [backup-simplify]: Simplify (- 0) into 0
41.038 * [backup-simplify]: Simplify 0 into 0
41.039 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.040 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.042 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
41.043 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
41.043 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 4 (log d)))))) into 0
41.048 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.049 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 l)))) into 0
41.050 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 2))))) into 0
41.051 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 3))))) into 0
41.052 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 6))))) into 0
41.054 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow l 7) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow l 7) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow l 7) 1)))) 6) into 0
41.056 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow l 7)))))) into 0
41.057 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.058 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4/3))))) into 0
41.058 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
41.059 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
41.060 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into 0
41.061 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
41.062 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
41.063 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
41.064 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.065 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
41.067 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))))) into 0
41.067 * [taylor]: Taking taylor expansion of 0 in l
41.067 * [backup-simplify]: Simplify 0 into 0
41.067 * [taylor]: Taking taylor expansion of 0 in h
41.067 * [backup-simplify]: Simplify 0 into 0
41.067 * [taylor]: Taking taylor expansion of 0 in h
41.067 * [backup-simplify]: Simplify 0 into 0
41.067 * [taylor]: Taking taylor expansion of 0 in h
41.067 * [backup-simplify]: Simplify 0 into 0
41.068 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
41.069 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
41.071 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
41.072 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
41.073 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.074 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.074 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.075 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.076 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.078 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
41.078 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
41.079 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 7 (log l)))))) into 0
41.080 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.081 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
41.081 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
41.081 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
41.082 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into 0
41.083 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
41.083 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
41.084 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
41.084 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.085 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
41.086 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))))) into 0
41.086 * [taylor]: Taking taylor expansion of 0 in h
41.086 * [backup-simplify]: Simplify 0 into 0
41.086 * [taylor]: Taking taylor expansion of 0 in M
41.086 * [backup-simplify]: Simplify 0 into 0
41.086 * [taylor]: Taking taylor expansion of 0 in M
41.086 * [backup-simplify]: Simplify 0 into 0
41.086 * [taylor]: Taking taylor expansion of 0 in M
41.086 * [backup-simplify]: Simplify 0 into 0
41.086 * [taylor]: Taking taylor expansion of 0 in M
41.086 * [backup-simplify]: Simplify 0 into 0
41.086 * [taylor]: Taking taylor expansion of 0 in M
41.086 * [backup-simplify]: Simplify 0 into 0
41.087 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
41.087 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
41.089 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
41.090 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
41.090 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.091 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 l)))) into 0
41.092 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 2))))) into 0
41.092 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 3))))) into 0
41.093 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 6))))) into 0
41.094 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow l 7) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow l 7) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow l 7) 1)))) 6) into 0
41.095 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow l 7)))))) into 0
41.096 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.096 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
41.097 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
41.099 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* +nan.0 +nan.0)))) (* 2 0)) into +nan.0
41.100 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (+ (* +nan.0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.101 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
41.101 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
41.102 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
41.102 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.103 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.105 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.105 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
41.105 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
41.105 * [taylor]: Taking taylor expansion of +nan.0 in M
41.105 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.105 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
41.105 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
41.105 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
41.105 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.105 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
41.105 * [taylor]: Taking taylor expansion of (pow D 2) in M
41.105 * [taylor]: Taking taylor expansion of D in M
41.105 * [backup-simplify]: Simplify D into D
41.105 * [taylor]: Taking taylor expansion of (pow M 2) in M
41.105 * [taylor]: Taking taylor expansion of M in M
41.105 * [backup-simplify]: Simplify 0 into 0
41.105 * [backup-simplify]: Simplify 1 into 1
41.105 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.106 * [backup-simplify]: Simplify (* 1 1) into 1
41.106 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
41.106 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
41.106 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
41.106 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
41.106 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
41.106 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
41.106 * [taylor]: Taking taylor expansion of 1/6 in M
41.106 * [backup-simplify]: Simplify 1/6 into 1/6
41.106 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
41.106 * [taylor]: Taking taylor expansion of (pow l 7) in M
41.106 * [taylor]: Taking taylor expansion of l in M
41.106 * [backup-simplify]: Simplify l into l
41.106 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.106 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.106 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.106 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.106 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.106 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.106 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.106 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
41.106 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
41.106 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
41.106 * [taylor]: Taking taylor expansion of 1/3 in M
41.106 * [backup-simplify]: Simplify 1/3 into 1/3
41.106 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
41.106 * [taylor]: Taking taylor expansion of (pow d 4) in M
41.106 * [taylor]: Taking taylor expansion of d in M
41.106 * [backup-simplify]: Simplify d into d
41.106 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.107 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.107 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.107 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.107 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.107 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.107 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.107 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.107 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.108 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
41.108 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
41.108 * [taylor]: Taking taylor expansion of +nan.0 in D
41.108 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.108 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
41.108 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
41.108 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
41.108 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.108 * [taylor]: Taking taylor expansion of (pow D 2) in D
41.108 * [taylor]: Taking taylor expansion of D in D
41.108 * [backup-simplify]: Simplify 0 into 0
41.108 * [backup-simplify]: Simplify 1 into 1
41.108 * [backup-simplify]: Simplify (* 1 1) into 1
41.108 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
41.108 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
41.108 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
41.108 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
41.108 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
41.108 * [taylor]: Taking taylor expansion of 1/6 in D
41.108 * [backup-simplify]: Simplify 1/6 into 1/6
41.108 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
41.108 * [taylor]: Taking taylor expansion of (pow l 7) in D
41.108 * [taylor]: Taking taylor expansion of l in D
41.108 * [backup-simplify]: Simplify l into l
41.108 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.108 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.109 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.109 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.109 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.109 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.109 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.109 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
41.109 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
41.109 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
41.109 * [taylor]: Taking taylor expansion of 1/3 in D
41.109 * [backup-simplify]: Simplify 1/3 into 1/3
41.109 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
41.109 * [taylor]: Taking taylor expansion of (pow d 4) in D
41.109 * [taylor]: Taking taylor expansion of d in D
41.109 * [backup-simplify]: Simplify d into d
41.109 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.109 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.109 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.109 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.109 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.109 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.109 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.110 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.110 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.110 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.113 * [backup-simplify]: Simplify (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (pow (/ 1 l) 7) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (pow (* (/ 1 (/ 1 D)) (* (/ 1 (/ 1 M)) (* (/ 1 h) (* 1 1)))) 2)) (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (pow (/ 1 l) 7) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (* (pow (/ 1 D) -2) (* (pow (/ 1 M) -2) (* (/ 1 h) (* 1 1))))) (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 l) (/ 1 d)) 1/3)) (* (pow (pow (/ 1 l) 7) 1/6) (pow (pow (/ 1 d) 4) 1/3))))) (pow (* (/ 1 (/ 1 D)) (* (/ 1 (/ 1 M)) (* 1 (* 1 1)))) 2)))) into (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))))))
41.114 * [backup-simplify]: Simplify (/ (* (* (* (fabs (/ (cbrt (/ 1 (- d))) (cbrt (/ 1 (- l))))) (sqrt (/ (cbrt (/ 1 (- d))) (cbrt (/ 1 (- l)))))) (sqrt (/ (/ 1 (- d)) (/ 1 (- h))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (* (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) (/ 1 (- h))))) (* (/ 1 (- l)) 2)) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.114 * [approximate]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in (d l h M D) around 0
41.114 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
41.114 * [taylor]: Taking taylor expansion of 1/8 in D
41.114 * [backup-simplify]: Simplify 1/8 into 1/8
41.114 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
41.114 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in D
41.114 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
41.114 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.114 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in D
41.114 * [taylor]: Taking taylor expansion of (pow D 2) in D
41.114 * [taylor]: Taking taylor expansion of D in D
41.114 * [backup-simplify]: Simplify 0 into 0
41.114 * [backup-simplify]: Simplify 1 into 1
41.114 * [taylor]: Taking taylor expansion of (pow M 2) in D
41.115 * [taylor]: Taking taylor expansion of M in D
41.115 * [backup-simplify]: Simplify M into M
41.115 * [backup-simplify]: Simplify (* 1 1) into 1
41.115 * [backup-simplify]: Simplify (* M M) into (pow M 2)
41.115 * [backup-simplify]: Simplify (* 1 (pow M 2)) into (pow M 2)
41.115 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow M 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow M 2))
41.115 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
41.115 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in D
41.115 * [taylor]: Taking taylor expansion of (/ 1 h) in D
41.115 * [taylor]: Taking taylor expansion of h in D
41.115 * [backup-simplify]: Simplify h into h
41.115 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
41.115 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
41.115 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
41.115 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
41.115 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
41.115 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
41.115 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
41.115 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
41.115 * [taylor]: Taking taylor expansion of 1/6 in D
41.115 * [backup-simplify]: Simplify 1/6 into 1/6
41.115 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
41.115 * [taylor]: Taking taylor expansion of (pow l 7) in D
41.115 * [taylor]: Taking taylor expansion of l in D
41.115 * [backup-simplify]: Simplify l into l
41.116 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.116 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.116 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.116 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.116 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.116 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.116 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.116 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
41.116 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
41.116 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
41.116 * [taylor]: Taking taylor expansion of 1/3 in D
41.116 * [backup-simplify]: Simplify 1/3 into 1/3
41.116 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
41.116 * [taylor]: Taking taylor expansion of (pow d 4) in D
41.116 * [taylor]: Taking taylor expansion of d in D
41.116 * [backup-simplify]: Simplify d into d
41.116 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.116 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.116 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.116 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.116 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.116 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
41.116 * [taylor]: Taking taylor expansion of 1/8 in M
41.116 * [backup-simplify]: Simplify 1/8 into 1/8
41.116 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
41.116 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
41.116 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
41.116 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.116 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
41.116 * [taylor]: Taking taylor expansion of (pow D 2) in M
41.116 * [taylor]: Taking taylor expansion of D in M
41.116 * [backup-simplify]: Simplify D into D
41.117 * [taylor]: Taking taylor expansion of (pow M 2) in M
41.117 * [taylor]: Taking taylor expansion of M in M
41.117 * [backup-simplify]: Simplify 0 into 0
41.117 * [backup-simplify]: Simplify 1 into 1
41.117 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.117 * [backup-simplify]: Simplify (* 1 1) into 1
41.117 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
41.117 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
41.117 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
41.117 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in M
41.117 * [taylor]: Taking taylor expansion of (/ 1 h) in M
41.117 * [taylor]: Taking taylor expansion of h in M
41.117 * [backup-simplify]: Simplify h into h
41.117 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
41.117 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
41.117 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
41.117 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
41.117 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
41.117 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
41.117 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
41.117 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
41.117 * [taylor]: Taking taylor expansion of 1/6 in M
41.117 * [backup-simplify]: Simplify 1/6 into 1/6
41.117 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
41.117 * [taylor]: Taking taylor expansion of (pow l 7) in M
41.118 * [taylor]: Taking taylor expansion of l in M
41.118 * [backup-simplify]: Simplify l into l
41.118 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.118 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.118 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.118 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.118 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.118 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.118 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.118 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
41.118 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
41.118 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
41.118 * [taylor]: Taking taylor expansion of 1/3 in M
41.118 * [backup-simplify]: Simplify 1/3 into 1/3
41.118 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
41.118 * [taylor]: Taking taylor expansion of (pow d 4) in M
41.118 * [taylor]: Taking taylor expansion of d in M
41.118 * [backup-simplify]: Simplify d into d
41.118 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.118 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.118 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.118 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.118 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.118 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in h
41.118 * [taylor]: Taking taylor expansion of 1/8 in h
41.118 * [backup-simplify]: Simplify 1/8 into 1/8
41.118 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in h
41.118 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
41.118 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
41.118 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.118 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
41.118 * [taylor]: Taking taylor expansion of (pow D 2) in h
41.118 * [taylor]: Taking taylor expansion of D in h
41.118 * [backup-simplify]: Simplify D into D
41.119 * [taylor]: Taking taylor expansion of (pow M 2) in h
41.119 * [taylor]: Taking taylor expansion of M in h
41.119 * [backup-simplify]: Simplify M into M
41.119 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.119 * [backup-simplify]: Simplify (* M M) into (pow M 2)
41.119 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
41.119 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
41.119 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in h
41.119 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
41.119 * [taylor]: Taking taylor expansion of (/ 1 h) in h
41.119 * [taylor]: Taking taylor expansion of h in h
41.119 * [backup-simplify]: Simplify 0 into 0
41.119 * [backup-simplify]: Simplify 1 into 1
41.119 * [backup-simplify]: Simplify (/ 1 1) into 1
41.119 * [backup-simplify]: Simplify (sqrt 0) into 0
41.120 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
41.120 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in h
41.120 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in h
41.120 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in h
41.120 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in h
41.120 * [taylor]: Taking taylor expansion of 1/6 in h
41.120 * [backup-simplify]: Simplify 1/6 into 1/6
41.120 * [taylor]: Taking taylor expansion of (log (pow l 7)) in h
41.120 * [taylor]: Taking taylor expansion of (pow l 7) in h
41.120 * [taylor]: Taking taylor expansion of l in h
41.120 * [backup-simplify]: Simplify l into l
41.120 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.121 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.121 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.121 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.121 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.121 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.121 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.121 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
41.121 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
41.121 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
41.121 * [taylor]: Taking taylor expansion of 1/3 in h
41.121 * [backup-simplify]: Simplify 1/3 into 1/3
41.121 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
41.121 * [taylor]: Taking taylor expansion of (pow d 4) in h
41.121 * [taylor]: Taking taylor expansion of d in h
41.121 * [backup-simplify]: Simplify d into d
41.121 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.121 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.121 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.121 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.121 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.121 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in l
41.121 * [taylor]: Taking taylor expansion of 1/8 in l
41.121 * [backup-simplify]: Simplify 1/8 into 1/8
41.121 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in l
41.121 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
41.121 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
41.121 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.121 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
41.121 * [taylor]: Taking taylor expansion of (pow D 2) in l
41.121 * [taylor]: Taking taylor expansion of D in l
41.121 * [backup-simplify]: Simplify D into D
41.121 * [taylor]: Taking taylor expansion of (pow M 2) in l
41.121 * [taylor]: Taking taylor expansion of M in l
41.121 * [backup-simplify]: Simplify M into M
41.121 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.122 * [backup-simplify]: Simplify (* M M) into (pow M 2)
41.122 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
41.122 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
41.122 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in l
41.122 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
41.122 * [taylor]: Taking taylor expansion of (/ 1 h) in l
41.122 * [taylor]: Taking taylor expansion of h in l
41.122 * [backup-simplify]: Simplify h into h
41.122 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
41.122 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
41.122 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
41.122 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
41.122 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in l
41.122 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in l
41.122 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in l
41.122 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in l
41.122 * [taylor]: Taking taylor expansion of 1/6 in l
41.122 * [backup-simplify]: Simplify 1/6 into 1/6
41.122 * [taylor]: Taking taylor expansion of (log (pow l 7)) in l
41.122 * [taylor]: Taking taylor expansion of (pow l 7) in l
41.122 * [taylor]: Taking taylor expansion of l in l
41.122 * [backup-simplify]: Simplify 0 into 0
41.122 * [backup-simplify]: Simplify 1 into 1
41.122 * [backup-simplify]: Simplify (* 1 1) into 1
41.123 * [backup-simplify]: Simplify (* 1 1) into 1
41.123 * [backup-simplify]: Simplify (* 1 1) into 1
41.123 * [backup-simplify]: Simplify (* 1 1) into 1
41.123 * [backup-simplify]: Simplify (log 1) into 0
41.124 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
41.124 * [backup-simplify]: Simplify (* 1/6 (* 7 (log l))) into (* 7/6 (log l))
41.124 * [backup-simplify]: Simplify (exp (* 7/6 (log l))) into (pow l 7/6)
41.124 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
41.124 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
41.124 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
41.124 * [taylor]: Taking taylor expansion of 1/3 in l
41.124 * [backup-simplify]: Simplify 1/3 into 1/3
41.124 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
41.124 * [taylor]: Taking taylor expansion of (pow d 4) in l
41.124 * [taylor]: Taking taylor expansion of d in l
41.124 * [backup-simplify]: Simplify d into d
41.124 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.124 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.125 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.125 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.125 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.125 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in d
41.125 * [taylor]: Taking taylor expansion of 1/8 in d
41.125 * [backup-simplify]: Simplify 1/8 into 1/8
41.125 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in d
41.125 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
41.125 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
41.125 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.125 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
41.125 * [taylor]: Taking taylor expansion of (pow D 2) in d
41.125 * [taylor]: Taking taylor expansion of D in d
41.125 * [backup-simplify]: Simplify D into D
41.125 * [taylor]: Taking taylor expansion of (pow M 2) in d
41.125 * [taylor]: Taking taylor expansion of M in d
41.125 * [backup-simplify]: Simplify M into M
41.125 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.125 * [backup-simplify]: Simplify (* M M) into (pow M 2)
41.125 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
41.125 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
41.125 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in d
41.125 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
41.125 * [taylor]: Taking taylor expansion of (/ 1 h) in d
41.125 * [taylor]: Taking taylor expansion of h in d
41.125 * [backup-simplify]: Simplify h into h
41.125 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
41.125 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
41.126 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
41.126 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
41.126 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in d
41.126 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in d
41.126 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in d
41.126 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in d
41.126 * [taylor]: Taking taylor expansion of 1/6 in d
41.126 * [backup-simplify]: Simplify 1/6 into 1/6
41.126 * [taylor]: Taking taylor expansion of (log (pow l 7)) in d
41.126 * [taylor]: Taking taylor expansion of (pow l 7) in d
41.126 * [taylor]: Taking taylor expansion of l in d
41.126 * [backup-simplify]: Simplify l into l
41.126 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.126 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.126 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.126 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.126 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.126 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.126 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.126 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
41.126 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
41.126 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
41.126 * [taylor]: Taking taylor expansion of 1/3 in d
41.126 * [backup-simplify]: Simplify 1/3 into 1/3
41.126 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
41.126 * [taylor]: Taking taylor expansion of (pow d 4) in d
41.126 * [taylor]: Taking taylor expansion of d in d
41.126 * [backup-simplify]: Simplify 0 into 0
41.126 * [backup-simplify]: Simplify 1 into 1
41.127 * [backup-simplify]: Simplify (* 1 1) into 1
41.127 * [backup-simplify]: Simplify (* 1 1) into 1
41.127 * [backup-simplify]: Simplify (log 1) into 0
41.127 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
41.127 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
41.128 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
41.128 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in d
41.128 * [taylor]: Taking taylor expansion of 1/8 in d
41.128 * [backup-simplify]: Simplify 1/8 into 1/8
41.128 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in d
41.128 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in d
41.128 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in d
41.128 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.128 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in d
41.128 * [taylor]: Taking taylor expansion of (pow D 2) in d
41.128 * [taylor]: Taking taylor expansion of D in d
41.128 * [backup-simplify]: Simplify D into D
41.128 * [taylor]: Taking taylor expansion of (pow M 2) in d
41.128 * [taylor]: Taking taylor expansion of M in d
41.128 * [backup-simplify]: Simplify M into M
41.128 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.128 * [backup-simplify]: Simplify (* M M) into (pow M 2)
41.128 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
41.128 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
41.128 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in d
41.128 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in d
41.128 * [taylor]: Taking taylor expansion of (/ 1 h) in d
41.128 * [taylor]: Taking taylor expansion of h in d
41.128 * [backup-simplify]: Simplify h into h
41.128 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
41.128 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
41.128 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
41.128 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
41.128 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in d
41.128 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in d
41.128 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in d
41.128 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in d
41.128 * [taylor]: Taking taylor expansion of 1/6 in d
41.128 * [backup-simplify]: Simplify 1/6 into 1/6
41.129 * [taylor]: Taking taylor expansion of (log (pow l 7)) in d
41.129 * [taylor]: Taking taylor expansion of (pow l 7) in d
41.129 * [taylor]: Taking taylor expansion of l in d
41.129 * [backup-simplify]: Simplify l into l
41.129 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.129 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.129 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.129 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.129 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.129 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.129 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.129 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in d
41.129 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in d
41.129 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in d
41.129 * [taylor]: Taking taylor expansion of 1/3 in d
41.129 * [backup-simplify]: Simplify 1/3 into 1/3
41.129 * [taylor]: Taking taylor expansion of (log (pow d 4)) in d
41.129 * [taylor]: Taking taylor expansion of (pow d 4) in d
41.129 * [taylor]: Taking taylor expansion of d in d
41.129 * [backup-simplify]: Simplify 0 into 0
41.129 * [backup-simplify]: Simplify 1 into 1
41.129 * [backup-simplify]: Simplify (* 1 1) into 1
41.130 * [backup-simplify]: Simplify (* 1 1) into 1
41.130 * [backup-simplify]: Simplify (log 1) into 0
41.130 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
41.130 * [backup-simplify]: Simplify (* 1/3 (* 4 (log d))) into (* 4/3 (log d))
41.130 * [backup-simplify]: Simplify (exp (* 4/3 (log d))) into (pow d 4/3)
41.130 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow d 4/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.130 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))
41.131 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))
41.131 * [backup-simplify]: Simplify (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.131 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in l
41.131 * [taylor]: Taking taylor expansion of 1/8 in l
41.131 * [backup-simplify]: Simplify 1/8 into 1/8
41.131 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in l
41.131 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in l
41.131 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in l
41.131 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.131 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in l
41.131 * [taylor]: Taking taylor expansion of (pow D 2) in l
41.131 * [taylor]: Taking taylor expansion of D in l
41.131 * [backup-simplify]: Simplify D into D
41.131 * [taylor]: Taking taylor expansion of (pow M 2) in l
41.131 * [taylor]: Taking taylor expansion of M in l
41.131 * [backup-simplify]: Simplify M into M
41.131 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.131 * [backup-simplify]: Simplify (* M M) into (pow M 2)
41.131 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
41.132 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
41.132 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in l
41.132 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in l
41.132 * [taylor]: Taking taylor expansion of (/ 1 h) in l
41.132 * [taylor]: Taking taylor expansion of h in l
41.132 * [backup-simplify]: Simplify h into h
41.132 * [backup-simplify]: Simplify (/ 1 h) into (/ 1 h)
41.132 * [backup-simplify]: Simplify (sqrt (/ 1 h)) into (sqrt (/ 1 h))
41.132 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)))) into 0
41.132 * [backup-simplify]: Simplify (/ 0 (* 2 (sqrt (/ 1 h)))) into 0
41.132 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in l
41.132 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in l
41.132 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in l
41.132 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in l
41.132 * [taylor]: Taking taylor expansion of 1/6 in l
41.132 * [backup-simplify]: Simplify 1/6 into 1/6
41.132 * [taylor]: Taking taylor expansion of (log (pow l 7)) in l
41.132 * [taylor]: Taking taylor expansion of (pow l 7) in l
41.132 * [taylor]: Taking taylor expansion of l in l
41.132 * [backup-simplify]: Simplify 0 into 0
41.132 * [backup-simplify]: Simplify 1 into 1
41.132 * [backup-simplify]: Simplify (* 1 1) into 1
41.133 * [backup-simplify]: Simplify (* 1 1) into 1
41.133 * [backup-simplify]: Simplify (* 1 1) into 1
41.133 * [backup-simplify]: Simplify (* 1 1) into 1
41.134 * [backup-simplify]: Simplify (log 1) into 0
41.134 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
41.134 * [backup-simplify]: Simplify (* 1/6 (* 7 (log l))) into (* 7/6 (log l))
41.134 * [backup-simplify]: Simplify (exp (* 7/6 (log l))) into (pow l 7/6)
41.134 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in l
41.134 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in l
41.134 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in l
41.134 * [taylor]: Taking taylor expansion of 1/3 in l
41.134 * [backup-simplify]: Simplify 1/3 into 1/3
41.134 * [taylor]: Taking taylor expansion of (log (pow d 4)) in l
41.134 * [taylor]: Taking taylor expansion of (pow d 4) in l
41.134 * [taylor]: Taking taylor expansion of d in l
41.134 * [backup-simplify]: Simplify d into d
41.134 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.134 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.134 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.134 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.134 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.135 * [backup-simplify]: Simplify (* (pow l 7/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.135 * [backup-simplify]: Simplify (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))
41.135 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))) into (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))
41.135 * [backup-simplify]: Simplify (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.135 * [taylor]: Taking taylor expansion of (* 1/8 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in h
41.135 * [taylor]: Taking taylor expansion of 1/8 in h
41.135 * [backup-simplify]: Simplify 1/8 into 1/8
41.135 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in h
41.135 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in h
41.135 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in h
41.135 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.135 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in h
41.135 * [taylor]: Taking taylor expansion of (pow D 2) in h
41.136 * [taylor]: Taking taylor expansion of D in h
41.136 * [backup-simplify]: Simplify D into D
41.136 * [taylor]: Taking taylor expansion of (pow M 2) in h
41.136 * [taylor]: Taking taylor expansion of M in h
41.136 * [backup-simplify]: Simplify M into M
41.136 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.136 * [backup-simplify]: Simplify (* M M) into (pow M 2)
41.136 * [backup-simplify]: Simplify (* (pow D 2) (pow M 2)) into (* (pow M 2) (pow D 2))
41.136 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (* (pow M 2) (pow D 2))) into (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2)))
41.136 * [taylor]: Taking taylor expansion of (* (sqrt (/ 1 h)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in h
41.136 * [taylor]: Taking taylor expansion of (sqrt (/ 1 h)) in h
41.136 * [taylor]: Taking taylor expansion of (/ 1 h) in h
41.136 * [taylor]: Taking taylor expansion of h in h
41.136 * [backup-simplify]: Simplify 0 into 0
41.136 * [backup-simplify]: Simplify 1 into 1
41.136 * [backup-simplify]: Simplify (/ 1 1) into 1
41.136 * [backup-simplify]: Simplify (sqrt 0) into 0
41.137 * [backup-simplify]: Simplify (/ 1 (* 2 (sqrt 0))) into +nan.0
41.137 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in h
41.137 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in h
41.137 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in h
41.137 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in h
41.137 * [taylor]: Taking taylor expansion of 1/6 in h
41.137 * [backup-simplify]: Simplify 1/6 into 1/6
41.137 * [taylor]: Taking taylor expansion of (log (pow l 7)) in h
41.137 * [taylor]: Taking taylor expansion of (pow l 7) in h
41.137 * [taylor]: Taking taylor expansion of l in h
41.137 * [backup-simplify]: Simplify l into l
41.138 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.138 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.138 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.138 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.138 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.138 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.138 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.138 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in h
41.138 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in h
41.138 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in h
41.138 * [taylor]: Taking taylor expansion of 1/3 in h
41.138 * [backup-simplify]: Simplify 1/3 into 1/3
41.138 * [taylor]: Taking taylor expansion of (log (pow d 4)) in h
41.138 * [taylor]: Taking taylor expansion of (pow d 4) in h
41.138 * [taylor]: Taking taylor expansion of d in h
41.138 * [backup-simplify]: Simplify d into d
41.138 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.138 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.138 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.138 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.138 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.138 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.138 * [backup-simplify]: Simplify (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into 0
41.139 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) into 0
41.139 * [backup-simplify]: Simplify (* 1/8 0) into 0
41.139 * [taylor]: Taking taylor expansion of 0 in M
41.139 * [backup-simplify]: Simplify 0 into 0
41.139 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.140 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.140 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
41.141 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
41.141 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (* 4 (log d)))) into 0
41.142 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 1) 1)))) into 0
41.142 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
41.142 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
41.142 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
41.142 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
41.142 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
41.143 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
41.143 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.143 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow d 4/3))) into 0
41.143 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
41.144 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
41.144 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
41.144 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
41.144 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.144 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
41.145 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
41.145 * [taylor]: Taking taylor expansion of 0 in l
41.145 * [backup-simplify]: Simplify 0 into 0
41.145 * [taylor]: Taking taylor expansion of 0 in h
41.145 * [backup-simplify]: Simplify 0 into 0
41.145 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
41.145 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
41.146 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
41.146 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
41.148 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.149 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.149 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.150 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.150 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.151 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow 1 1)))) 1) into 0
41.151 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
41.152 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (* 7 (log l)))) into 0
41.152 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 1) 1)))) into 0
41.152 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
41.152 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
41.152 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
41.153 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
41.153 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
41.153 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.153 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))) into 0
41.154 * [backup-simplify]: Simplify (+ (* 1/8 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
41.154 * [taylor]: Taking taylor expansion of 0 in h
41.154 * [backup-simplify]: Simplify 0 into 0
41.154 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
41.154 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
41.154 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
41.155 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
41.155 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.155 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
41.155 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
41.156 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
41.156 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
41.156 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
41.156 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
41.157 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.157 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
41.157 * [backup-simplify]: Simplify (+ (* 0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.157 * [backup-simplify]: Simplify (+ (* M 0) (* 0 M)) into 0
41.158 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
41.158 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 (pow M 2))) into 0
41.158 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.159 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.159 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.159 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
41.159 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
41.159 * [taylor]: Taking taylor expansion of +nan.0 in M
41.159 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.159 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
41.159 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
41.159 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
41.160 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.160 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
41.160 * [taylor]: Taking taylor expansion of (pow D 2) in M
41.160 * [taylor]: Taking taylor expansion of D in M
41.160 * [backup-simplify]: Simplify D into D
41.160 * [taylor]: Taking taylor expansion of (pow M 2) in M
41.160 * [taylor]: Taking taylor expansion of M in M
41.160 * [backup-simplify]: Simplify 0 into 0
41.160 * [backup-simplify]: Simplify 1 into 1
41.160 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.160 * [backup-simplify]: Simplify (* 1 1) into 1
41.160 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
41.160 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
41.160 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
41.160 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
41.160 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
41.160 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
41.160 * [taylor]: Taking taylor expansion of 1/6 in M
41.160 * [backup-simplify]: Simplify 1/6 into 1/6
41.160 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
41.160 * [taylor]: Taking taylor expansion of (pow l 7) in M
41.160 * [taylor]: Taking taylor expansion of l in M
41.160 * [backup-simplify]: Simplify l into l
41.160 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.160 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.160 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.160 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.161 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.161 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.161 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.161 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
41.161 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
41.161 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
41.161 * [taylor]: Taking taylor expansion of 1/3 in M
41.161 * [backup-simplify]: Simplify 1/3 into 1/3
41.161 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
41.161 * [taylor]: Taking taylor expansion of (pow d 4) in M
41.161 * [taylor]: Taking taylor expansion of d in M
41.161 * [backup-simplify]: Simplify d into d
41.161 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.161 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.161 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.161 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.161 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.161 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.161 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.162 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.162 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.162 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
41.162 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
41.162 * [taylor]: Taking taylor expansion of +nan.0 in D
41.162 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.162 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
41.162 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
41.162 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
41.162 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.162 * [taylor]: Taking taylor expansion of (pow D 2) in D
41.162 * [taylor]: Taking taylor expansion of D in D
41.162 * [backup-simplify]: Simplify 0 into 0
41.162 * [backup-simplify]: Simplify 1 into 1
41.162 * [backup-simplify]: Simplify (* 1 1) into 1
41.162 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
41.163 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
41.163 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
41.163 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
41.163 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
41.163 * [taylor]: Taking taylor expansion of 1/6 in D
41.163 * [backup-simplify]: Simplify 1/6 into 1/6
41.163 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
41.163 * [taylor]: Taking taylor expansion of (pow l 7) in D
41.163 * [taylor]: Taking taylor expansion of l in D
41.163 * [backup-simplify]: Simplify l into l
41.163 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.163 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.163 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.163 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.163 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.163 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.163 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.163 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
41.163 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
41.163 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
41.163 * [taylor]: Taking taylor expansion of 1/3 in D
41.163 * [backup-simplify]: Simplify 1/3 into 1/3
41.163 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
41.163 * [taylor]: Taking taylor expansion of (pow d 4) in D
41.163 * [taylor]: Taking taylor expansion of d in D
41.163 * [backup-simplify]: Simplify d into d
41.163 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.163 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.163 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.163 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.163 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.164 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.164 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.164 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.164 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.164 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.165 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.166 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.167 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
41.167 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
41.168 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (* 4 (log d))))) into 0
41.169 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.169 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
41.169 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
41.169 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
41.170 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
41.171 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow l 7) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow l 7) 1)))) 2) into 0
41.171 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (pow l 7))))) into 0
41.172 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.172 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (* 0 (pow d 4/3)))) into 0
41.172 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
41.173 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
41.173 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
41.174 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
41.174 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
41.174 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
41.175 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.175 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
41.176 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
41.176 * [taylor]: Taking taylor expansion of 0 in l
41.176 * [backup-simplify]: Simplify 0 into 0
41.176 * [taylor]: Taking taylor expansion of 0 in h
41.176 * [backup-simplify]: Simplify 0 into 0
41.176 * [taylor]: Taking taylor expansion of 0 in h
41.176 * [backup-simplify]: Simplify 0 into 0
41.176 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
41.177 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
41.178 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
41.178 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
41.179 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.180 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.180 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.181 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.182 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (* 0 1))) into 0
41.185 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow 1 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow 1 1)))) 2) into 0
41.186 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
41.187 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (* 7 (log l))))) into 0
41.188 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.188 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
41.189 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)))) into 0
41.189 * [backup-simplify]: Simplify (/ (- 0 (pow 0 2) (+)) (* 2 (sqrt (/ 1 h)))) into 0
41.190 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
41.191 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
41.191 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
41.192 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
41.192 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.193 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))) into 0
41.195 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
41.195 * [taylor]: Taking taylor expansion of 0 in h
41.195 * [backup-simplify]: Simplify 0 into 0
41.195 * [taylor]: Taking taylor expansion of 0 in M
41.195 * [backup-simplify]: Simplify 0 into 0
41.195 * [taylor]: Taking taylor expansion of 0 in M
41.195 * [backup-simplify]: Simplify 0 into 0
41.195 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (* 0 d))) into 0
41.196 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (* 0 (pow d 2)))) into 0
41.197 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow d 4) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow d 4) 1)))) 2) into 0
41.198 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (* 0 (log (pow d 4))))) into 0
41.200 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.200 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 l))) into 0
41.201 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 2)))) into 0
41.201 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (* 0 (pow l 3)))) into 0
41.202 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (* 0 (pow l 6)))) into 0
41.203 * [backup-simplify]: Simplify (/ (+ (* -1 (/ (* (pow (* 1 0) 2)) (pow (pow l 7) 2))) (* 1 (/ (* 1 (pow (* 2 0) 1)) (pow (pow l 7) 1)))) 2) into 0
41.204 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (* 0 (log (pow l 7))))) into 0
41.205 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 2) 2)) (* (/ (pow 0 1) 1)))) into 0
41.206 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3)))) into 0
41.207 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)))) into 0
41.210 * [backup-simplify]: Simplify (/ (- 0 (pow +nan.0 2) (+)) (* 2 0)) into +nan.0
41.211 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.211 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (* 0 M))) into 0
41.212 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (* 0 D))) into 0
41.212 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (* 0 (pow M 2)))) into 0
41.212 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.213 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.214 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.214 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
41.214 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
41.214 * [taylor]: Taking taylor expansion of +nan.0 in M
41.214 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.214 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
41.215 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
41.215 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
41.215 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.215 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
41.215 * [taylor]: Taking taylor expansion of (pow D 2) in M
41.215 * [taylor]: Taking taylor expansion of D in M
41.215 * [backup-simplify]: Simplify D into D
41.215 * [taylor]: Taking taylor expansion of (pow M 2) in M
41.215 * [taylor]: Taking taylor expansion of M in M
41.215 * [backup-simplify]: Simplify 0 into 0
41.215 * [backup-simplify]: Simplify 1 into 1
41.215 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.215 * [backup-simplify]: Simplify (* 1 1) into 1
41.215 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
41.215 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
41.215 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
41.215 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
41.215 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
41.215 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
41.215 * [taylor]: Taking taylor expansion of 1/6 in M
41.215 * [backup-simplify]: Simplify 1/6 into 1/6
41.215 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
41.215 * [taylor]: Taking taylor expansion of (pow l 7) in M
41.215 * [taylor]: Taking taylor expansion of l in M
41.215 * [backup-simplify]: Simplify l into l
41.215 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.215 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.215 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.216 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.216 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.216 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.216 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.216 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
41.216 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
41.216 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
41.216 * [taylor]: Taking taylor expansion of 1/3 in M
41.216 * [backup-simplify]: Simplify 1/3 into 1/3
41.216 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
41.216 * [taylor]: Taking taylor expansion of (pow d 4) in M
41.216 * [taylor]: Taking taylor expansion of d in M
41.216 * [backup-simplify]: Simplify d into d
41.216 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.216 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.216 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.216 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.216 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.216 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.216 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.217 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.217 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.217 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
41.217 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
41.217 * [taylor]: Taking taylor expansion of +nan.0 in D
41.217 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.217 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
41.217 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
41.217 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
41.217 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.217 * [taylor]: Taking taylor expansion of (pow D 2) in D
41.217 * [taylor]: Taking taylor expansion of D in D
41.217 * [backup-simplify]: Simplify 0 into 0
41.217 * [backup-simplify]: Simplify 1 into 1
41.217 * [backup-simplify]: Simplify (* 1 1) into 1
41.218 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
41.218 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
41.218 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
41.218 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
41.218 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
41.218 * [taylor]: Taking taylor expansion of 1/6 in D
41.218 * [backup-simplify]: Simplify 1/6 into 1/6
41.218 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
41.218 * [taylor]: Taking taylor expansion of (pow l 7) in D
41.218 * [taylor]: Taking taylor expansion of l in D
41.218 * [backup-simplify]: Simplify l into l
41.218 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.218 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.218 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.218 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.218 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.218 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.218 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.218 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
41.218 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
41.218 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
41.218 * [taylor]: Taking taylor expansion of 1/3 in D
41.218 * [backup-simplify]: Simplify 1/3 into 1/3
41.218 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
41.218 * [taylor]: Taking taylor expansion of (pow d 4) in D
41.218 * [taylor]: Taking taylor expansion of d in D
41.218 * [backup-simplify]: Simplify d into d
41.218 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.218 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.218 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.218 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.218 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.219 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.219 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.219 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.219 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.219 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.219 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
41.220 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
41.220 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
41.220 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
41.221 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.221 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
41.221 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
41.221 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
41.221 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
41.222 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
41.222 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
41.222 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.223 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
41.223 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.223 * [backup-simplify]: Simplify (+ (* D 0) (* 0 D)) into 0
41.223 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (* 0 1)) into 0
41.224 * [backup-simplify]: Simplify (- (/ 0 (pow D 2)) (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (/ 0 (pow D 2))))) into 0
41.224 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
41.224 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
41.224 * [backup-simplify]: Simplify (- 0) into 0
41.225 * [taylor]: Taking taylor expansion of 0 in D
41.225 * [backup-simplify]: Simplify 0 into 0
41.225 * [taylor]: Taking taylor expansion of 0 in D
41.225 * [backup-simplify]: Simplify 0 into 0
41.225 * [backup-simplify]: Simplify (+ (* d 0) (* 0 d)) into 0
41.225 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (* 0 (pow d 2))) into 0
41.225 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow d 4) 1)))) 1) into 0
41.226 * [backup-simplify]: Simplify (+ (* 1/3 0) (* 0 (log (pow d 4)))) into 0
41.226 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.226 * [backup-simplify]: Simplify (+ (* l 0) (* 0 l)) into 0
41.226 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 2))) into 0
41.226 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (* 0 (pow l 3))) into 0
41.226 * [backup-simplify]: Simplify (+ (* l 0) (* 0 (pow l 6))) into 0
41.227 * [backup-simplify]: Simplify (/ (+ (* 1 (/ (* (pow (* 1 0) 1)) (pow (pow l 7) 1)))) 1) into 0
41.227 * [backup-simplify]: Simplify (+ (* 1/6 0) (* 0 (log (pow l 7)))) into 0
41.228 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 1) 1)))) into 0
41.228 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (* 0 (pow (pow d 4) 1/3))) into 0
41.228 * [backup-simplify]: Simplify (+ (* 1 0) (* 0 1)) into 0
41.229 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* (fabs (pow (/ l d) 1/3)) (/ 0 1)))) into 0
41.229 * [backup-simplify]: Simplify (+ (* (fabs (pow (/ l d) 1/3)) 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into 0
41.229 * [backup-simplify]: Simplify (+ (* +nan.0 0) (* 0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into 0
41.230 * [backup-simplify]: Simplify (- 0) into 0
41.230 * [backup-simplify]: Simplify 0 into 0
41.230 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.231 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.234 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
41.234 * [backup-simplify]: Simplify (+ (* (- -4) (log d)) 0) into (* 4 (log d))
41.235 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 4 (log d)))))) into 0
41.236 * [backup-simplify]: Simplify (* (exp (* 4/3 (log d))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.236 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 l)))) into 0
41.237 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 2))))) into 0
41.237 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 3))))) into 0
41.238 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 6))))) into 0
41.239 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow l 7) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow l 7) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow l 7) 1)))) 6) into 0
41.240 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow l 7)))))) into 0
41.241 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.242 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 4/3))))) into 0
41.242 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
41.242 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
41.243 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into 0
41.244 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
41.244 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
41.245 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
41.245 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.246 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
41.247 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))))) into 0
41.247 * [taylor]: Taking taylor expansion of 0 in l
41.247 * [backup-simplify]: Simplify 0 into 0
41.247 * [taylor]: Taking taylor expansion of 0 in h
41.247 * [backup-simplify]: Simplify 0 into 0
41.247 * [taylor]: Taking taylor expansion of 0 in h
41.247 * [backup-simplify]: Simplify 0 into 0
41.247 * [taylor]: Taking taylor expansion of 0 in h
41.247 * [backup-simplify]: Simplify 0 into 0
41.250 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
41.250 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
41.252 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
41.253 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
41.254 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.254 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.255 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.255 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.256 * [backup-simplify]: Simplify (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 1)))) into 0
41.259 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow 1 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow 1 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow 1 1)))) 6) into 0
41.259 * [backup-simplify]: Simplify (+ (* (- -7) (log l)) 0) into (* 7 (log l))
41.260 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* 7 (log l)))))) into 0
41.261 * [backup-simplify]: Simplify (* (exp (* 7/6 (log l))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.261 * [backup-simplify]: Simplify (+ (* (pow l 7/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
41.262 * [backup-simplify]: Simplify (- (+ (* (/ 1 h) (/ 0 h)) (* 0 (/ 0 h)) (* 0 (/ 0 h)))) into 0
41.262 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* 0 0)))) (* 2 (sqrt (/ 1 h)))) into 0
41.263 * [backup-simplify]: Simplify (+ (* (sqrt (/ 1 h)) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into 0
41.263 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
41.264 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
41.264 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
41.265 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.265 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3))))))) into 0
41.266 * [backup-simplify]: Simplify (+ (* 1/8 0) (+ (* 0 0) (+ (* 0 0) (* 0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (* (sqrt (/ 1 h)) (pow (pow d 4) 1/3)))))))) into 0
41.267 * [taylor]: Taking taylor expansion of 0 in h
41.267 * [backup-simplify]: Simplify 0 into 0
41.267 * [taylor]: Taking taylor expansion of 0 in M
41.267 * [backup-simplify]: Simplify 0 into 0
41.267 * [taylor]: Taking taylor expansion of 0 in M
41.267 * [backup-simplify]: Simplify 0 into 0
41.267 * [taylor]: Taking taylor expansion of 0 in M
41.267 * [backup-simplify]: Simplify 0 into 0
41.267 * [taylor]: Taking taylor expansion of 0 in M
41.267 * [backup-simplify]: Simplify 0 into 0
41.267 * [taylor]: Taking taylor expansion of 0 in M
41.267 * [backup-simplify]: Simplify 0 into 0
41.267 * [backup-simplify]: Simplify (+ (* d 0) (+ (* 0 0) (+ (* 0 0) (* 0 d)))) into 0
41.268 * [backup-simplify]: Simplify (+ (* (pow d 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow d 2))))) into 0
41.269 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow d 4) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow d 4) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow d 4) 1)))) 6) into 0
41.270 * [backup-simplify]: Simplify (+ (* 1/3 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow d 4)))))) into 0
41.271 * [backup-simplify]: Simplify (* (exp (* 1/3 (log (pow d 4)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.272 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 l)))) into 0
41.272 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 2))))) into 0
41.273 * [backup-simplify]: Simplify (+ (* (pow l 3) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 3))))) into 0
41.273 * [backup-simplify]: Simplify (+ (* l 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow l 6))))) into 0
41.275 * [backup-simplify]: Simplify (/ (+ (* 2 (/ (* (pow (* 1 0) 3)) (pow (pow l 7) 3))) (* -3 (/ (* (pow (* 1 0) 1) (pow (* 2 0) 1)) (pow (pow l 7) 2))) (* 1 (/ (* 1 1 (pow (* 6 0) 1)) (pow (pow l 7) 1)))) 6) into 0
41.276 * [backup-simplify]: Simplify (+ (* 1/6 0) (+ (* 0 0) (+ (* 0 0) (* 0 (log (pow l 7)))))) into 0
41.277 * [backup-simplify]: Simplify (* (exp (* 1/6 (log (pow l 7)))) (+ (* (/ (pow 0 3) 6)) (* (/ (pow 0 1) 1) (/ (pow 0 1) 1)) (* (/ (pow 0 1) 1)))) into 0
41.278 * [backup-simplify]: Simplify (+ (* (pow (pow l 7) 1/6) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow (pow d 4) 1/3))))) into 0
41.278 * [backup-simplify]: Simplify (- (+ (* 1 (/ 0 1)) (* 0 (/ 0 1)))) into 0
41.281 * [backup-simplify]: Simplify (/ (- 0 (+ (* 2 (* +nan.0 +nan.0)))) (* 2 0)) into +nan.0
41.282 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* +nan.0 0) (+ (* +nan.0 0) (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) into (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.282 * [backup-simplify]: Simplify (+ (* M 0) (+ (* 0 0) (+ (* 0 0) (* 0 M)))) into 0
41.283 * [backup-simplify]: Simplify (+ (* D 0) (+ (* 0 0) (+ (* 0 0) (* 0 D)))) into 0
41.283 * [backup-simplify]: Simplify (+ (* (pow D 2) 0) (+ (* 0 0) (+ (* 0 0) (* 0 (pow M 2))))) into 0
41.284 * [backup-simplify]: Simplify (- (/ 0 (* (pow M 2) (pow D 2))) (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))) (* 0 (/ 0 (* (pow M 2) (pow D 2)))))) into 0
41.285 * [backup-simplify]: Simplify (+ (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (+ (* 0 (- (* +nan.0 (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.286 * [backup-simplify]: Simplify (+ (* 1/8 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (+ (* 0 (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))) (* 0 0)))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.286 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in M
41.286 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in M
41.286 * [taylor]: Taking taylor expansion of +nan.0 in M
41.286 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.286 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in M
41.286 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (* (pow D 2) (pow M 2))) in M
41.286 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in M
41.287 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.287 * [taylor]: Taking taylor expansion of (* (pow D 2) (pow M 2)) in M
41.287 * [taylor]: Taking taylor expansion of (pow D 2) in M
41.287 * [taylor]: Taking taylor expansion of D in M
41.287 * [backup-simplify]: Simplify D into D
41.287 * [taylor]: Taking taylor expansion of (pow M 2) in M
41.287 * [taylor]: Taking taylor expansion of M in M
41.287 * [backup-simplify]: Simplify 0 into 0
41.287 * [backup-simplify]: Simplify 1 into 1
41.287 * [backup-simplify]: Simplify (* D D) into (pow D 2)
41.287 * [backup-simplify]: Simplify (* 1 1) into 1
41.287 * [backup-simplify]: Simplify (* (pow D 2) 1) into (pow D 2)
41.287 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) into (/ (fabs (pow (/ l d) 1/3)) (pow D 2))
41.287 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in M
41.287 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in M
41.287 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in M
41.287 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in M
41.287 * [taylor]: Taking taylor expansion of 1/6 in M
41.287 * [backup-simplify]: Simplify 1/6 into 1/6
41.287 * [taylor]: Taking taylor expansion of (log (pow l 7)) in M
41.287 * [taylor]: Taking taylor expansion of (pow l 7) in M
41.287 * [taylor]: Taking taylor expansion of l in M
41.287 * [backup-simplify]: Simplify l into l
41.287 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.287 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.287 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.287 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.288 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.288 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.288 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.288 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in M
41.288 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in M
41.288 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in M
41.288 * [taylor]: Taking taylor expansion of 1/3 in M
41.288 * [backup-simplify]: Simplify 1/3 into 1/3
41.288 * [taylor]: Taking taylor expansion of (log (pow d 4)) in M
41.288 * [taylor]: Taking taylor expansion of (pow d 4) in M
41.288 * [taylor]: Taking taylor expansion of d in M
41.288 * [backup-simplify]: Simplify d into d
41.288 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.288 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.288 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.288 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.288 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.288 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.288 * [backup-simplify]: Simplify (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.289 * [backup-simplify]: Simplify (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.289 * [backup-simplify]: Simplify (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.289 * [taylor]: Taking taylor expansion of (- (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) in D
41.289 * [taylor]: Taking taylor expansion of (* +nan.0 (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) in D
41.289 * [taylor]: Taking taylor expansion of +nan.0 in D
41.289 * [backup-simplify]: Simplify +nan.0 into +nan.0
41.289 * [taylor]: Taking taylor expansion of (* (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) in D
41.289 * [taylor]: Taking taylor expansion of (/ (fabs (pow (/ l d) 1/3)) (pow D 2)) in D
41.289 * [taylor]: Taking taylor expansion of (fabs (pow (/ l d) 1/3)) in D
41.289 * [backup-simplify]: Simplify (fabs (pow (/ l d) 1/3)) into (fabs (pow (/ l d) 1/3))
41.289 * [taylor]: Taking taylor expansion of (pow D 2) in D
41.289 * [taylor]: Taking taylor expansion of D in D
41.289 * [backup-simplify]: Simplify 0 into 0
41.289 * [backup-simplify]: Simplify 1 into 1
41.289 * [backup-simplify]: Simplify (* 1 1) into 1
41.290 * [backup-simplify]: Simplify (/ (fabs (pow (/ l d) 1/3)) 1) into (fabs (pow (/ l d) 1/3))
41.290 * [taylor]: Taking taylor expansion of (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) in D
41.290 * [taylor]: Taking taylor expansion of (pow (pow l 7) 1/6) in D
41.290 * [taylor]: Taking taylor expansion of (exp (* 1/6 (log (pow l 7)))) in D
41.290 * [taylor]: Taking taylor expansion of (* 1/6 (log (pow l 7))) in D
41.290 * [taylor]: Taking taylor expansion of 1/6 in D
41.290 * [backup-simplify]: Simplify 1/6 into 1/6
41.290 * [taylor]: Taking taylor expansion of (log (pow l 7)) in D
41.290 * [taylor]: Taking taylor expansion of (pow l 7) in D
41.290 * [taylor]: Taking taylor expansion of l in D
41.290 * [backup-simplify]: Simplify l into l
41.290 * [backup-simplify]: Simplify (* l l) into (pow l 2)
41.290 * [backup-simplify]: Simplify (* l (pow l 2)) into (pow l 3)
41.290 * [backup-simplify]: Simplify (* (pow l 3) (pow l 3)) into (pow l 6)
41.290 * [backup-simplify]: Simplify (* l (pow l 6)) into (pow l 7)
41.290 * [backup-simplify]: Simplify (log (pow l 7)) into (log (pow l 7))
41.290 * [backup-simplify]: Simplify (* 1/6 (log (pow l 7))) into (* 1/6 (log (pow l 7)))
41.290 * [backup-simplify]: Simplify (exp (* 1/6 (log (pow l 7)))) into (pow (pow l 7) 1/6)
41.290 * [taylor]: Taking taylor expansion of (pow (pow d 4) 1/3) in D
41.290 * [taylor]: Taking taylor expansion of (exp (* 1/3 (log (pow d 4)))) in D
41.290 * [taylor]: Taking taylor expansion of (* 1/3 (log (pow d 4))) in D
41.290 * [taylor]: Taking taylor expansion of 1/3 in D
41.290 * [backup-simplify]: Simplify 1/3 into 1/3
41.290 * [taylor]: Taking taylor expansion of (log (pow d 4)) in D
41.290 * [taylor]: Taking taylor expansion of (pow d 4) in D
41.290 * [taylor]: Taking taylor expansion of d in D
41.290 * [backup-simplify]: Simplify d into d
41.290 * [backup-simplify]: Simplify (* d d) into (pow d 2)
41.290 * [backup-simplify]: Simplify (* (pow d 2) (pow d 2)) into (pow d 4)
41.290 * [backup-simplify]: Simplify (log (pow d 4)) into (log (pow d 4))
41.290 * [backup-simplify]: Simplify (* 1/3 (log (pow d 4))) into (* 1/3 (log (pow d 4)))
41.291 * [backup-simplify]: Simplify (exp (* 1/3 (log (pow d 4)))) into (pow (pow d 4) 1/3)
41.291 * [backup-simplify]: Simplify (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)) into (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))
41.291 * [backup-simplify]: Simplify (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))) into (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))
41.291 * [backup-simplify]: Simplify (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))) into (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))
41.292 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.292 * [backup-simplify]: Simplify (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3))))) into (- (* +nan.0 (* (fabs (pow (/ l d) 1/3)) (* (pow (pow l 7) 1/6) (pow (pow d 4) 1/3)))))
41.296 * [backup-simplify]: Simplify (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (pow (/ 1 (- l)) 7) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (pow (* (/ 1 (/ 1 (- D))) (* (/ 1 (/ 1 (- M))) (* (/ 1 (- h)) (* 1 1)))) 2)) (+ (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (pow (/ 1 (- l)) 7) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (* (pow (/ 1 (- D)) -2) (* (pow (/ 1 (- M)) -2) (* (/ 1 (- h)) (* 1 1))))) (* (- (* +nan.0 (* (fabs (pow (/ (/ 1 (- l)) (/ 1 (- d))) 1/3)) (* (pow (pow (/ 1 (- l)) 7) 1/6) (pow (pow (/ 1 (- d)) 4) 1/3))))) (pow (* (/ 1 (/ 1 (- D))) (* (/ 1 (/ 1 (- M))) (* 1 (* 1 1)))) 2)))) into (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 (pow l 7)) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 (pow l 7)) 1/6)))))))))
41.296 * * * * [progress]: [ 4 / 4 ] generating series at (2 2 1 2 2 1)
41.296 * [backup-simplify]: Simplify (/ M (/ 2 (/ D d))) into (* 1/2 (/ (* M D) d))
41.296 * [approximate]: Taking taylor expansion of (* 1/2 (/ (* M D) d)) in (M D d) around 0
41.296 * [taylor]: Taking taylor expansion of (* 1/2 (/ (* M D) d)) in d
41.296 * [taylor]: Taking taylor expansion of 1/2 in d
41.296 * [backup-simplify]: Simplify 1/2 into 1/2
41.296 * [taylor]: Taking taylor expansion of (/ (* M D) d) in d
41.296 * [taylor]: Taking taylor expansion of (* M D) in d
41.296 * [taylor]: Taking taylor expansion of M in d
41.296 * [backup-simplify]: Simplify M into M
41.296 * [taylor]: Taking taylor expansion of D in d
41.296 * [backup-simplify]: Simplify D into D
41.296 * [taylor]: Taking taylor expansion of d in d
41.296 * [backup-simplify]: Simplify 0 into 0
41.296 * [backup-simplify]: Simplify 1 into 1
41.296 * [backup-simplify]: Simplify (* M D) into (* M D)
41.296 * [backup-simplify]: Simplify (/ (* M D) 1) into (* M D)
41.296 * [taylor]: Taking taylor expansion of (* 1/2 (/ (* M D) d)) in D
41.296 * [taylor]: Taking taylor expansion of 1/2 in D
41.296 * [backup-simplify]: Simplify 1/2 into 1/2
41.296 * [taylor]: Taking taylor expansion of (/ (* M D) d) in D
41.296 * [taylor]: Taking taylor expansion of (* M D) in D
41.296 * [taylor]: Taking taylor expansion of M in D
41.296 * [backup-simplify]: Simplify M into M
41.296 * [taylor]: Taking taylor expansion of D in D
41.296 * [backup-simplify]: Simplify 0 into 0
41.296 * [backup-simplify]: Simplify 1 into 1
41.296 * [taylor]: Taking taylor expansion of d in D
41.296 * [backup-simplify]: Simplify d into d
41.296 * [backup-simplify]: Simplify (* M 0) into 0
41.297 * [backup-simplify]: Simplify (+ (* M 1) (* 0 0)) into M
41.297 * [backup-simplify]: Simplify (/ M d) into (/ M d)
41.297 * [taylor]: Taking taylor expansion of (* 1/2 (/ (* M D) d)) in M
41.297 * [taylor]: Taking taylor expansion of 1/2 in M
41.297 * [backup-simplify]: Simplify 1/2 into 1/2
41.297 * [taylor]: Taking taylor expansion of (/ (* M D) d) in M
41.297 * [taylor]: Taking taylor expansion of (* M D) in M
41.297 * [taylor]: Taking taylor expansion of M in M
41.297 * [backup-simplify]: Simplify 0 into 0
41.297 * [backup-simplify]: Simplify 1 into 1
41.297 * [taylor]: Taking taylor expansion of D in M
41.297 * [backup-simplify]: Simplify D into D
41.297 * [taylor]: Taking taylor expansion of d in M
41.297 * [backup-simplify]: Simplify d into d
41.297 * [backup-simplify]: Simplify (* 0 D) into 0
41.297 * [backup-simplify]: Simplify (+ (* 0 0) (* 1 D)) into D
41.297 * [backup-simplify]: Simplify (/ D d) into (/ D d)
41.297 * [taylor]: Taking taylor expansion of (* 1/2 (/ (* M D) d)) in M
41.297 * [taylor]: Taking taylor expansion of 1/2 in M
41.297 * [backup-simplify]: Simplify 1/2 into 1/2
41.297 * [taylor]: Taking taylor expansion of (/ (* M D) d) in M
41.297 * [taylor]: Taking taylor expansion of (* M D) in M
41.297 * [taylor]: Taking taylor expansion of M in M
41.297 * [backup-simplify]: Simplify 0 into 0
41.297 * [backup-simplify]: Simplify 1 into 1
41.297 * [taylor]: Taking taylor expansion of D in M
41.298 * [backup-simplify]: Simplify D into D
41.298 * [taylor]: Taking taylor expansion of d in M
41.298 * [backup-simplify]: Simplify d into d
41.298 * [backup-simplify]: Simplify (* 0 D) into 0
41.298 * [backup-simplify]: Simplify (+ (* 0 0) (* 1 D)) into D
41.298 * [backup-simplify]: Simplify (/ D d) into (/ D d)
41.298 * [backup-simplify]: Simplify (* 1/2 (/ D d)) into (* 1/2 (/ D d))
41.298 * [taylor]: Taking taylor expansion of (* 1/2 (/ D d)) in D
41.298 * [taylor]: Taking taylor expansion of 1/2 in D
41.298 * [backup-simplify]: Simplify 1/2 into 1/2
41.298 * [taylor]: Taking taylor expansion of (/ D d) in D
41.298 * [taylor]: Taking taylor expansion of D in D
41.298 * [backup-simplify]: Simplify 0 into 0
41.298 * [backup-simplify]: Simplify 1 into 1
41.298 * [taylor]: Taking taylor expansion of d in D
41.298 * [backup-simplify]: Simplify d into d
41.298 * [backup-simplify]: Simplify (/ 1 d) into (/ 1 d)
41.298 * [backup-simplify]: Simplify (* 1/2 (/ 1 d)) into (/ 1/2 d)
41.298 * [taylor]: Taking taylor expansion of (/ 1/2 d) in d
41.298 * [taylor]: Taking taylor expansion of 1/2 in d
41.298 * [backup-simplify]: Simplify 1/2 into 1/2
41.298 * [taylor]: Taking taylor expansion of d in d
41.298 * [backup-simplify]: Simplify 0 into 0
41.298 * [backup-simplify]: Simplify 1 into 1
41.299 * [backup-simplify]: Simplify (/ 1/2 1) into 1/2
41.299 * [backup-simplify]: Simplify 1/2 into 1/2
41.299 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* 1 0) (* 0 D))) into 0
41.299 * [backup-simplify]: Simplify (- (/ 0 d) (+ (* (/ D d) (/ 0 d)))) into 0
41.299 * [backup-simplify]: Simplify (+ (* 1/2 0) (* 0 (/ D d))) into 0
41.300 * [taylor]: Taking taylor expansion of 0 in D
41.300 * [backup-simplify]: Simplify 0 into 0
41.300 * [taylor]: Taking taylor expansion of 0 in d
41.300 * [backup-simplify]: Simplify 0 into 0
41.300 * [backup-simplify]: Simplify (- (/ 0 d) (+ (* (/ 1 d) (/ 0 d)))) into 0
41.300 * [backup-simplify]: Simplify (+ (* 1/2 0) (* 0 (/ 1 d))) into 0
41.300 * [taylor]: Taking taylor expansion of 0 in d
41.300 * [backup-simplify]: Simplify 0 into 0
41.301 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* 1/2 (/ 0 1)))) into 0
41.301 * [backup-simplify]: Simplify 0 into 0
41.301 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 D)))) into 0
41.301 * [backup-simplify]: Simplify (- (/ 0 d) (+ (* (/ D d) (/ 0 d)) (* 0 (/ 0 d)))) into 0
41.302 * [backup-simplify]: Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ D d)))) into 0
41.302 * [taylor]: Taking taylor expansion of 0 in D
41.302 * [backup-simplify]: Simplify 0 into 0
41.302 * [taylor]: Taking taylor expansion of 0 in d
41.302 * [backup-simplify]: Simplify 0 into 0
41.302 * [taylor]: Taking taylor expansion of 0 in d
41.302 * [backup-simplify]: Simplify 0 into 0
41.302 * [backup-simplify]: Simplify (- (/ 0 d) (+ (* (/ 1 d) (/ 0 d)) (* 0 (/ 0 d)))) into 0
41.303 * [backup-simplify]: Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ 1 d)))) into 0
41.303 * [taylor]: Taking taylor expansion of 0 in d
41.303 * [backup-simplify]: Simplify 0 into 0
41.303 * [backup-simplify]: Simplify 0 into 0
41.303 * [backup-simplify]: Simplify 0 into 0
41.303 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* 1/2 (/ 0 1)) (* 0 (/ 0 1)))) into 0
41.303 * [backup-simplify]: Simplify 0 into 0
41.304 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (+ (* 0 0) (* 0 D))))) into 0
41.304 * [backup-simplify]: Simplify (- (/ 0 d) (+ (* (/ D d) (/ 0 d)) (* 0 (/ 0 d)) (* 0 (/ 0 d)))) into 0
41.305 * [backup-simplify]: Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ D d))))) into 0
41.305 * [taylor]: Taking taylor expansion of 0 in D
41.305 * [backup-simplify]: Simplify 0 into 0
41.305 * [taylor]: Taking taylor expansion of 0 in d
41.305 * [backup-simplify]: Simplify 0 into 0
41.305 * [taylor]: Taking taylor expansion of 0 in d
41.305 * [backup-simplify]: Simplify 0 into 0
41.305 * [taylor]: Taking taylor expansion of 0 in d
41.305 * [backup-simplify]: Simplify 0 into 0
41.306 * [backup-simplify]: Simplify (- (/ 0 d) (+ (* (/ 1 d) (/ 0 d)) (* 0 (/ 0 d)) (* 0 (/ 0 d)))) into 0
41.306 * [backup-simplify]: Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 0) (* 0 (/ 1 d))))) into 0
41.306 * [taylor]: Taking taylor expansion of 0 in d
41.306 * [backup-simplify]: Simplify 0 into 0
41.306 * [backup-simplify]: Simplify 0 into 0
41.306 * [backup-simplify]: Simplify 0 into 0
41.306 * [backup-simplify]: Simplify (* 1/2 (* (/ 1 d) (* D M))) into (* 1/2 (/ (* M D) d))
41.307 * [backup-simplify]: Simplify (/ (/ 1 M) (/ 2 (/ (/ 1 D) (/ 1 d)))) into (* 1/2 (/ d (* M D)))
41.307 * [approximate]: Taking taylor expansion of (* 1/2 (/ d (* M D))) in (M D d) around 0
41.307 * [taylor]: Taking taylor expansion of (* 1/2 (/ d (* M D))) in d
41.307 * [taylor]: Taking taylor expansion of 1/2 in d
41.307 * [backup-simplify]: Simplify 1/2 into 1/2
41.307 * [taylor]: Taking taylor expansion of (/ d (* M D)) in d
41.307 * [taylor]: Taking taylor expansion of d in d
41.307 * [backup-simplify]: Simplify 0 into 0
41.307 * [backup-simplify]: Simplify 1 into 1
41.307 * [taylor]: Taking taylor expansion of (* M D) in d
41.307 * [taylor]: Taking taylor expansion of M in d
41.307 * [backup-simplify]: Simplify M into M
41.307 * [taylor]: Taking taylor expansion of D in d
41.307 * [backup-simplify]: Simplify D into D
41.307 * [backup-simplify]: Simplify (* M D) into (* M D)
41.307 * [backup-simplify]: Simplify (/ 1 (* M D)) into (/ 1 (* M D))
41.307 * [taylor]: Taking taylor expansion of (* 1/2 (/ d (* M D))) in D
41.307 * [taylor]: Taking taylor expansion of 1/2 in D
41.307 * [backup-simplify]: Simplify 1/2 into 1/2
41.307 * [taylor]: Taking taylor expansion of (/ d (* M D)) in D
41.307 * [taylor]: Taking taylor expansion of d in D
41.307 * [backup-simplify]: Simplify d into d
41.307 * [taylor]: Taking taylor expansion of (* M D) in D
41.307 * [taylor]: Taking taylor expansion of M in D
41.307 * [backup-simplify]: Simplify M into M
41.307 * [taylor]: Taking taylor expansion of D in D
41.307 * [backup-simplify]: Simplify 0 into 0
41.307 * [backup-simplify]: Simplify 1 into 1
41.307 * [backup-simplify]: Simplify (* M 0) into 0
41.307 * [backup-simplify]: Simplify (+ (* M 1) (* 0 0)) into M
41.307 * [backup-simplify]: Simplify (/ d M) into (/ d M)
41.307 * [taylor]: Taking taylor expansion of (* 1/2 (/ d (* M D))) in M
41.307 * [taylor]: Taking taylor expansion of 1/2 in M
41.307 * [backup-simplify]: Simplify 1/2 into 1/2
41.307 * [taylor]: Taking taylor expansion of (/ d (* M D)) in M
41.307 * [taylor]: Taking taylor expansion of d in M
41.307 * [backup-simplify]: Simplify d into d
41.307 * [taylor]: Taking taylor expansion of (* M D) in M
41.307 * [taylor]: Taking taylor expansion of M in M
41.307 * [backup-simplify]: Simplify 0 into 0
41.307 * [backup-simplify]: Simplify 1 into 1
41.307 * [taylor]: Taking taylor expansion of D in M
41.307 * [backup-simplify]: Simplify D into D
41.308 * [backup-simplify]: Simplify (* 0 D) into 0
41.308 * [backup-simplify]: Simplify (+ (* 0 0) (* 1 D)) into D
41.308 * [backup-simplify]: Simplify (/ d D) into (/ d D)
41.308 * [taylor]: Taking taylor expansion of (* 1/2 (/ d (* M D))) in M
41.308 * [taylor]: Taking taylor expansion of 1/2 in M
41.308 * [backup-simplify]: Simplify 1/2 into 1/2
41.308 * [taylor]: Taking taylor expansion of (/ d (* M D)) in M
41.308 * [taylor]: Taking taylor expansion of d in M
41.308 * [backup-simplify]: Simplify d into d
41.308 * [taylor]: Taking taylor expansion of (* M D) in M
41.308 * [taylor]: Taking taylor expansion of M in M
41.308 * [backup-simplify]: Simplify 0 into 0
41.308 * [backup-simplify]: Simplify 1 into 1
41.308 * [taylor]: Taking taylor expansion of D in M
41.308 * [backup-simplify]: Simplify D into D
41.308 * [backup-simplify]: Simplify (* 0 D) into 0
41.308 * [backup-simplify]: Simplify (+ (* 0 0) (* 1 D)) into D
41.308 * [backup-simplify]: Simplify (/ d D) into (/ d D)
41.308 * [backup-simplify]: Simplify (* 1/2 (/ d D)) into (* 1/2 (/ d D))
41.308 * [taylor]: Taking taylor expansion of (* 1/2 (/ d D)) in D
41.308 * [taylor]: Taking taylor expansion of 1/2 in D
41.309 * [backup-simplify]: Simplify 1/2 into 1/2
41.309 * [taylor]: Taking taylor expansion of (/ d D) in D
41.309 * [taylor]: Taking taylor expansion of d in D
41.309 * [backup-simplify]: Simplify d into d
41.309 * [taylor]: Taking taylor expansion of D in D
41.309 * [backup-simplify]: Simplify 0 into 0
41.309 * [backup-simplify]: Simplify 1 into 1
41.309 * [backup-simplify]: Simplify (/ d 1) into d
41.309 * [backup-simplify]: Simplify (* 1/2 d) into (* 1/2 d)
41.309 * [taylor]: Taking taylor expansion of (* 1/2 d) in d
41.309 * [taylor]: Taking taylor expansion of 1/2 in d
41.309 * [backup-simplify]: Simplify 1/2 into 1/2
41.309 * [taylor]: Taking taylor expansion of d in d
41.309 * [backup-simplify]: Simplify 0 into 0
41.309 * [backup-simplify]: Simplify 1 into 1
41.309 * [backup-simplify]: Simplify (+ (* 1/2 1) (* 0 0)) into 1/2
41.309 * [backup-simplify]: Simplify 1/2 into 1/2
41.310 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* 1 0) (* 0 D))) into 0
41.310 * [backup-simplify]: Simplify (- (/ 0 D) (+ (* (/ d D) (/ 0 D)))) into 0
41.310 * [backup-simplify]: Simplify (+ (* 1/2 0) (* 0 (/ d D))) into 0
41.310 * [taylor]: Taking taylor expansion of 0 in D
41.310 * [backup-simplify]: Simplify 0 into 0
41.311 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* d (/ 0 1)))) into 0
41.311 * [backup-simplify]: Simplify (+ (* 1/2 0) (* 0 d)) into 0
41.311 * [taylor]: Taking taylor expansion of 0 in d
41.311 * [backup-simplify]: Simplify 0 into 0
41.311 * [backup-simplify]: Simplify 0 into 0
41.312 * [backup-simplify]: Simplify (+ (* 1/2 0) (+ (* 0 1) (* 0 0))) into 0
41.312 * [backup-simplify]: Simplify 0 into 0
41.312 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 D)))) into 0
41.312 * [backup-simplify]: Simplify (- (/ 0 D) (+ (* (/ d D) (/ 0 D)) (* 0 (/ 0 D)))) into 0
41.313 * [backup-simplify]: Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 (/ d D)))) into 0
41.313 * [taylor]: Taking taylor expansion of 0 in D
41.313 * [backup-simplify]: Simplify 0 into 0
41.313 * [taylor]: Taking taylor expansion of 0 in d
41.313 * [backup-simplify]: Simplify 0 into 0
41.313 * [backup-simplify]: Simplify 0 into 0
41.314 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* d (/ 0 1)) (* 0 (/ 0 1)))) into 0
41.314 * [backup-simplify]: Simplify (+ (* 1/2 0) (+ (* 0 0) (* 0 d))) into 0
41.314 * [taylor]: Taking taylor expansion of 0 in d
41.314 * [backup-simplify]: Simplify 0 into 0
41.315 * [backup-simplify]: Simplify 0 into 0
41.315 * [backup-simplify]: Simplify 0 into 0
41.315 * [backup-simplify]: Simplify (+ (* 1/2 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
41.315 * [backup-simplify]: Simplify 0 into 0
41.315 * [backup-simplify]: Simplify (* 1/2 (* (/ 1 d) (* (/ 1 (/ 1 D)) (/ 1 (/ 1 M))))) into (* 1/2 (/ (* M D) d))
41.315 * [backup-simplify]: Simplify (/ (/ 1 (- M)) (/ 2 (/ (/ 1 (- D)) (/ 1 (- d))))) into (* -1/2 (/ d (* M D)))
41.316 * [approximate]: Taking taylor expansion of (* -1/2 (/ d (* M D))) in (M D d) around 0
41.316 * [taylor]: Taking taylor expansion of (* -1/2 (/ d (* M D))) in d
41.316 * [taylor]: Taking taylor expansion of -1/2 in d
41.316 * [backup-simplify]: Simplify -1/2 into -1/2
41.316 * [taylor]: Taking taylor expansion of (/ d (* M D)) in d
41.316 * [taylor]: Taking taylor expansion of d in d
41.316 * [backup-simplify]: Simplify 0 into 0
41.316 * [backup-simplify]: Simplify 1 into 1
41.316 * [taylor]: Taking taylor expansion of (* M D) in d
41.316 * [taylor]: Taking taylor expansion of M in d
41.316 * [backup-simplify]: Simplify M into M
41.316 * [taylor]: Taking taylor expansion of D in d
41.316 * [backup-simplify]: Simplify D into D
41.316 * [backup-simplify]: Simplify (* M D) into (* M D)
41.316 * [backup-simplify]: Simplify (/ 1 (* M D)) into (/ 1 (* M D))
41.316 * [taylor]: Taking taylor expansion of (* -1/2 (/ d (* M D))) in D
41.316 * [taylor]: Taking taylor expansion of -1/2 in D
41.316 * [backup-simplify]: Simplify -1/2 into -1/2
41.316 * [taylor]: Taking taylor expansion of (/ d (* M D)) in D
41.316 * [taylor]: Taking taylor expansion of d in D
41.316 * [backup-simplify]: Simplify d into d
41.316 * [taylor]: Taking taylor expansion of (* M D) in D
41.316 * [taylor]: Taking taylor expansion of M in D
41.316 * [backup-simplify]: Simplify M into M
41.316 * [taylor]: Taking taylor expansion of D in D
41.316 * [backup-simplify]: Simplify 0 into 0
41.316 * [backup-simplify]: Simplify 1 into 1
41.316 * [backup-simplify]: Simplify (* M 0) into 0
41.317 * [backup-simplify]: Simplify (+ (* M 1) (* 0 0)) into M
41.317 * [backup-simplify]: Simplify (/ d M) into (/ d M)
41.317 * [taylor]: Taking taylor expansion of (* -1/2 (/ d (* M D))) in M
41.317 * [taylor]: Taking taylor expansion of -1/2 in M
41.317 * [backup-simplify]: Simplify -1/2 into -1/2
41.317 * [taylor]: Taking taylor expansion of (/ d (* M D)) in M
41.317 * [taylor]: Taking taylor expansion of d in M
41.317 * [backup-simplify]: Simplify d into d
41.317 * [taylor]: Taking taylor expansion of (* M D) in M
41.317 * [taylor]: Taking taylor expansion of M in M
41.317 * [backup-simplify]: Simplify 0 into 0
41.317 * [backup-simplify]: Simplify 1 into 1
41.317 * [taylor]: Taking taylor expansion of D in M
41.317 * [backup-simplify]: Simplify D into D
41.317 * [backup-simplify]: Simplify (* 0 D) into 0
41.317 * [backup-simplify]: Simplify (+ (* 0 0) (* 1 D)) into D
41.317 * [backup-simplify]: Simplify (/ d D) into (/ d D)
41.317 * [taylor]: Taking taylor expansion of (* -1/2 (/ d (* M D))) in M
41.317 * [taylor]: Taking taylor expansion of -1/2 in M
41.318 * [backup-simplify]: Simplify -1/2 into -1/2
41.318 * [taylor]: Taking taylor expansion of (/ d (* M D)) in M
41.318 * [taylor]: Taking taylor expansion of d in M
41.318 * [backup-simplify]: Simplify d into d
41.318 * [taylor]: Taking taylor expansion of (* M D) in M
41.318 * [taylor]: Taking taylor expansion of M in M
41.318 * [backup-simplify]: Simplify 0 into 0
41.318 * [backup-simplify]: Simplify 1 into 1
41.318 * [taylor]: Taking taylor expansion of D in M
41.318 * [backup-simplify]: Simplify D into D
41.318 * [backup-simplify]: Simplify (* 0 D) into 0
41.318 * [backup-simplify]: Simplify (+ (* 0 0) (* 1 D)) into D
41.318 * [backup-simplify]: Simplify (/ d D) into (/ d D)
41.318 * [backup-simplify]: Simplify (* -1/2 (/ d D)) into (* -1/2 (/ d D))
41.318 * [taylor]: Taking taylor expansion of (* -1/2 (/ d D)) in D
41.318 * [taylor]: Taking taylor expansion of -1/2 in D
41.319 * [backup-simplify]: Simplify -1/2 into -1/2
41.319 * [taylor]: Taking taylor expansion of (/ d D) in D
41.319 * [taylor]: Taking taylor expansion of d in D
41.319 * [backup-simplify]: Simplify d into d
41.319 * [taylor]: Taking taylor expansion of D in D
41.319 * [backup-simplify]: Simplify 0 into 0
41.319 * [backup-simplify]: Simplify 1 into 1
41.319 * [backup-simplify]: Simplify (/ d 1) into d
41.319 * [backup-simplify]: Simplify (* -1/2 d) into (* -1/2 d)
41.319 * [taylor]: Taking taylor expansion of (* -1/2 d) in d
41.319 * [taylor]: Taking taylor expansion of -1/2 in d
41.319 * [backup-simplify]: Simplify -1/2 into -1/2
41.319 * [taylor]: Taking taylor expansion of d in d
41.319 * [backup-simplify]: Simplify 0 into 0
41.319 * [backup-simplify]: Simplify 1 into 1
41.320 * [backup-simplify]: Simplify (+ (* -1/2 1) (* 0 0)) into -1/2
41.320 * [backup-simplify]: Simplify -1/2 into -1/2
41.320 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* 1 0) (* 0 D))) into 0
41.320 * [backup-simplify]: Simplify (- (/ 0 D) (+ (* (/ d D) (/ 0 D)))) into 0
41.321 * [backup-simplify]: Simplify (+ (* -1/2 0) (* 0 (/ d D))) into 0
41.321 * [taylor]: Taking taylor expansion of 0 in D
41.321 * [backup-simplify]: Simplify 0 into 0
41.321 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* d (/ 0 1)))) into 0
41.322 * [backup-simplify]: Simplify (+ (* -1/2 0) (* 0 d)) into 0
41.322 * [taylor]: Taking taylor expansion of 0 in d
41.322 * [backup-simplify]: Simplify 0 into 0
41.322 * [backup-simplify]: Simplify 0 into 0
41.322 * [backup-simplify]: Simplify (+ (* -1/2 0) (+ (* 0 1) (* 0 0))) into 0
41.322 * [backup-simplify]: Simplify 0 into 0
41.323 * [backup-simplify]: Simplify (+ (* 0 0) (+ (* 1 0) (+ (* 0 0) (* 0 D)))) into 0
41.323 * [backup-simplify]: Simplify (- (/ 0 D) (+ (* (/ d D) (/ 0 D)) (* 0 (/ 0 D)))) into 0
41.324 * [backup-simplify]: Simplify (+ (* -1/2 0) (+ (* 0 0) (* 0 (/ d D)))) into 0
41.324 * [taylor]: Taking taylor expansion of 0 in D
41.324 * [backup-simplify]: Simplify 0 into 0
41.324 * [taylor]: Taking taylor expansion of 0 in d
41.324 * [backup-simplify]: Simplify 0 into 0
41.324 * [backup-simplify]: Simplify 0 into 0
41.325 * [backup-simplify]: Simplify (- (/ 0 1) (+ (* d (/ 0 1)) (* 0 (/ 0 1)))) into 0
41.325 * [backup-simplify]: Simplify (+ (* -1/2 0) (+ (* 0 0) (* 0 d))) into 0
41.325 * [taylor]: Taking taylor expansion of 0 in d
41.325 * [backup-simplify]: Simplify 0 into 0
41.325 * [backup-simplify]: Simplify 0 into 0
41.325 * [backup-simplify]: Simplify 0 into 0
41.326 * [backup-simplify]: Simplify (+ (* -1/2 0) (+ (* 0 0) (+ (* 0 1) (* 0 0)))) into 0
41.326 * [backup-simplify]: Simplify 0 into 0
41.326 * [backup-simplify]: Simplify (* -1/2 (* (/ 1 (- d)) (* (/ 1 (/ 1 (- D))) (/ 1 (/ 1 (- M)))))) into (* 1/2 (/ (* M D) d))
41.326 * * * [progress]: simplifying candidates
41.326 * * * * [progress]: [ 1 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (pow (/ d h) 1/2)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.326 * * * * [progress]: [ 2 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (pow (sqrt (/ d h)) 1)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.326 * * * * [progress]: [ 3 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (exp (log (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.326 * * * * [progress]: [ 4 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (log (exp (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.326 * * * * [progress]: [ 5 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.326 * * * * [progress]: [ 6 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (cbrt (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.326 * * * * [progress]: [ 7 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (* (cbrt (/ d h)) (cbrt (/ d h)))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 8 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 9 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h)))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 10 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h))) (sqrt (/ (cbrt d) (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 11 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (* (cbrt d) (cbrt d)) 1)) (sqrt (/ (cbrt d) h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 12 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h)))) (sqrt (/ (sqrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 13 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (sqrt d) (sqrt h))) (sqrt (/ (sqrt d) (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 14 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (sqrt d) 1)) (sqrt (/ (sqrt d) h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 15 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 16 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (sqrt h))) (sqrt (/ d (sqrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 17 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 1)) (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 18 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt 1) (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 19 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt d) (sqrt (/ 1 h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 20 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (/ (sqrt d) (sqrt h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 21 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (pow (/ d h) (/ 1 2))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 22 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (sqrt (/ d h))) (sqrt (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 23 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (fabs (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 24 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (fabs (/ (sqrt d) (sqrt h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 25 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* 1 (sqrt (/ d h)))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.327 * * * * [progress]: [ 26 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (posit16->real (real->posit16 (sqrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.328 * * * * [progress]: [ 27 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 28 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 29 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 30 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 31 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 32 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 33 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 34 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 35 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 36 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (pow (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) 1) (* l 2))))>
41.328 * * * * [progress]: [ 37 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.328 * * * * [progress]: [ 38 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.328 * * * * [progress]: [ 39 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.328 * * * * [progress]: [ 40 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.328 * * * * [progress]: [ 41 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.328 * * * * [progress]: [ 42 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.328 * * * * [progress]: [ 43 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 44 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 45 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 46 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.329 * * * * [progress]: [ 47 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 48 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 49 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 50 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 51 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.329 * * * * [progress]: [ 52 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 53 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 54 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 55 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 56 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.329 * * * * [progress]: [ 57 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.329 * * * * [progress]: [ 58 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 59 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 60 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.329 * * * * [progress]: [ 61 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 62 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.330 * * * * [progress]: [ 63 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 64 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 65 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 66 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 67 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.330 * * * * [progress]: [ 68 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 69 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 70 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 71 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 72 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.330 * * * * [progress]: [ 73 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 74 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 75 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 76 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.330 * * * * [progress]: [ 77 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.330 * * * * [progress]: [ 78 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.330 * * * * [progress]: [ 79 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 80 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 81 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 82 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 83 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.331 * * * * [progress]: [ 84 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 85 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 86 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 87 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 88 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.331 * * * * [progress]: [ 89 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 90 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 91 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 92 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 93 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.331 * * * * [progress]: [ 94 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 95 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))) (* l 2))))>
41.331 * * * * [progress]: [ 96 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.332 * * * * [progress]: [ 97 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))) (* l 2))))>
41.332 * * * * [progress]: [ 98 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 99 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 100 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (exp (log (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 101 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (log (exp (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 102 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 103 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 104 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 105 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 106 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 107 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 108 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 109 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 110 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 111 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.332 * * * * [progress]: [ 112 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 113 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 114 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 115 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 116 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 117 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 118 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 119 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 120 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 121 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 122 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 123 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 124 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 125 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 126 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.333 * * * * [progress]: [ 127 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 128 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 129 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 130 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 131 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 132 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 133 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 134 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 135 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 136 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 137 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 138 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 139 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 140 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 141 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.334 * * * * [progress]: [ 142 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 143 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 144 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 145 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 146 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 147 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 148 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 149 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 150 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 151 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 152 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 153 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 154 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 155 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 156 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 157 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.335 * * * * [progress]: [ 158 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 159 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 160 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 161 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 162 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 163 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 164 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 165 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 166 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (cbrt (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 167 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (sqrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (sqrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.336 * * * * [progress]: [ 168 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* M h))) (* (* (sqrt (cbrt l)) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
41.336 * * * * [progress]: [ 169 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d)))) (* l 2))))>
41.336 * * * * [progress]: [ 170 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d)))) (* l 2))))>
41.336 * * * * [progress]: [ 171 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* M (* M h))) (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
41.336 * * * * [progress]: [ 172 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (sqrt h) (/ 2 (/ D d)))) (* l 2))))>
41.336 * * * * [progress]: [ 173 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (sqrt h) (/ 2 (/ D d)))) (* l 2))))>
41.336 * * * * [progress]: [ 174 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* M (* M h))) (* (sqrt (cbrt l)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))>
41.336 * * * * [progress]: [ 175 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (* (sqrt (cbrt l)) (/ 2 (/ D d)))) (* l 2))))>
41.337 * * * * [progress]: [ 176 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (sqrt (cbrt l)) (/ 2 (/ D d)))) (* l 2))))>
41.337 * * * * [progress]: [ 177 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* 1 (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))>
41.337 * * * * [progress]: [ 178 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))>
41.337 * * * * [progress]: [ 179 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))>
41.337 * * * * [progress]: [ 180 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* M h))) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (* l 2))))>
41.337 * * * * [progress]: [ 181 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (/ 2 (/ D d))) (* l 2))))>
41.337 * * * * [progress]: [ 182 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (/ 2 (/ D d))) (* l 2))))>
41.337 * * * * [progress]: [ 183 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (sqrt (cbrt l)) (sqrt h))) (* l 2))))>
41.337 * * * * [progress]: [ 184 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (sqrt h)) (* l 2))))>
41.337 * * * * [progress]: [ 185 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (sqrt (cbrt l))) (* l 2))))>
41.337 * * * * [progress]: [ 186 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (posit16->real (real->posit16 (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))) (* l 2))))>
41.337 * * * * [progress]: [ 187 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* l 2))))>
41.337 * * * * [progress]: [ 188 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (pow (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)) 1)))>
41.337 * * * * [progress]: [ 189 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.337 * * * * [progress]: [ 190 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.337 * * * * [progress]: [ 191 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.337 * * * * [progress]: [ 192 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.337 * * * * [progress]: [ 193 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.337 * * * * [progress]: [ 194 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.338 * * * * [progress]: [ 195 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.338 * * * * [progress]: [ 196 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.338 * * * * [progress]: [ 197 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.338 * * * * [progress]: [ 198 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.338 * * * * [progress]: [ 199 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.338 * * * * [progress]: [ 200 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.338 * * * * [progress]: [ 201 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.338 * * * * [progress]: [ 202 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.338 * * * * [progress]: [ 203 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.338 * * * * [progress]: [ 204 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.338 * * * * [progress]: [ 205 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.338 * * * * [progress]: [ 206 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.338 * * * * [progress]: [ 207 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.338 * * * * [progress]: [ 208 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.338 * * * * [progress]: [ 209 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.338 * * * * [progress]: [ 210 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 211 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.339 * * * * [progress]: [ 212 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 213 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.339 * * * * [progress]: [ 214 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 215 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.339 * * * * [progress]: [ 216 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 217 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.339 * * * * [progress]: [ 218 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 219 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.339 * * * * [progress]: [ 220 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 221 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.339 * * * * [progress]: [ 222 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 223 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.339 * * * * [progress]: [ 224 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 225 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.339 * * * * [progress]: [ 226 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.339 * * * * [progress]: [ 227 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 228 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.340 * * * * [progress]: [ 229 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 230 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.340 * * * * [progress]: [ 231 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 232 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.340 * * * * [progress]: [ 233 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 234 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.340 * * * * [progress]: [ 235 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 236 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.340 * * * * [progress]: [ 237 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 238 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.340 * * * * [progress]: [ 239 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 240 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.340 * * * * [progress]: [ 241 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 242 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.340 * * * * [progress]: [ 243 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.340 * * * * [progress]: [ 244 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 245 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.341 * * * * [progress]: [ 246 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 247 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.341 * * * * [progress]: [ 248 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 249 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.341 * * * * [progress]: [ 250 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 251 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.341 * * * * [progress]: [ 252 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 253 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.341 * * * * [progress]: [ 254 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 255 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.341 * * * * [progress]: [ 256 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 257 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.341 * * * * [progress]: [ 258 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 259 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.341 * * * * [progress]: [ 260 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.341 * * * * [progress]: [ 261 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 262 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 263 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 264 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 265 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 266 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 267 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 268 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 269 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 270 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 271 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 272 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 273 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 274 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 275 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 276 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 277 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.342 * * * * [progress]: [ 278 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.342 * * * * [progress]: [ 279 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 280 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.343 * * * * [progress]: [ 281 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 282 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.343 * * * * [progress]: [ 283 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 284 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.343 * * * * [progress]: [ 285 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 286 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.343 * * * * [progress]: [ 287 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 288 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.343 * * * * [progress]: [ 289 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 290 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.343 * * * * [progress]: [ 291 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 292 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.343 * * * * [progress]: [ 293 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 294 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.343 * * * * [progress]: [ 295 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.343 * * * * [progress]: [ 296 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.344 * * * * [progress]: [ 297 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.344 * * * * [progress]: [ 298 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.344 * * * * [progress]: [ 299 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.344 * * * * [progress]: [ 300 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.344 * * * * [progress]: [ 301 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.344 * * * * [progress]: [ 302 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.344 * * * * [progress]: [ 303 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (+ (log l) (log 2))))))>
41.344 * * * * [progress]: [ 304 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h)))) (log (* l 2))))))>
41.344 * * * * [progress]: [ 305 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.344 * * * * [progress]: [ 306 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h)))) (log (* l 2))))))>
41.344 * * * * [progress]: [ 307 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.344 * * * * [progress]: [ 308 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.344 * * * * [progress]: [ 309 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (+ (log l) (log 2))))))>
41.344 * * * * [progress]: [ 310 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h)))) (log (* l 2))))))>
41.345 * * * * [progress]: [ 311 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.345 * * * * [progress]: [ 312 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.345 * * * * [progress]: [ 313 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.345 * * * * [progress]: [ 314 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (+ (log (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.345 * * * * [progress]: [ 315 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (log (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (+ (log l) (log 2))))))>
41.345 * * * * [progress]: [ 316 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (- (log (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (log (* l 2))))))>
41.345 * * * * [progress]: [ 317 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (exp (log (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
41.345 * * * * [progress]: [ 318 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (log (exp (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
41.345 * * * * [progress]: [ 319 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.345 * * * * [progress]: [ 320 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.345 * * * * [progress]: [ 321 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.345 * * * * [progress]: [ 322 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.345 * * * * [progress]: [ 323 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.345 * * * * [progress]: [ 324 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.345 * * * * [progress]: [ 325 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.345 * * * * [progress]: [ 326 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.346 * * * * [progress]: [ 327 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.346 * * * * [progress]: [ 328 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.346 * * * * [progress]: [ 329 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.346 * * * * [progress]: [ 330 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.346 * * * * [progress]: [ 331 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.346 * * * * [progress]: [ 332 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.346 * * * * [progress]: [ 333 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.346 * * * * [progress]: [ 334 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.346 * * * * [progress]: [ 335 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.346 * * * * [progress]: [ 336 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.346 * * * * [progress]: [ 337 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.346 * * * * [progress]: [ 338 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.346 * * * * [progress]: [ 339 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.346 * * * * [progress]: [ 340 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.347 * * * * [progress]: [ 341 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.347 * * * * [progress]: [ 342 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.347 * * * * [progress]: [ 343 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.347 * * * * [progress]: [ 344 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.347 * * * * [progress]: [ 345 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.347 * * * * [progress]: [ 346 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.347 * * * * [progress]: [ 347 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.347 * * * * [progress]: [ 348 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.347 * * * * [progress]: [ 349 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.347 * * * * [progress]: [ 350 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.347 * * * * [progress]: [ 351 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.347 * * * * [progress]: [ 352 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.347 * * * * [progress]: [ 353 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.347 * * * * [progress]: [ 354 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.347 * * * * [progress]: [ 355 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.348 * * * * [progress]: [ 356 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.348 * * * * [progress]: [ 357 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.348 * * * * [progress]: [ 358 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.348 * * * * [progress]: [ 359 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.348 * * * * [progress]: [ 360 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.348 * * * * [progress]: [ 361 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.348 * * * * [progress]: [ 362 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.348 * * * * [progress]: [ 363 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.348 * * * * [progress]: [ 364 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.348 * * * * [progress]: [ 365 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.348 * * * * [progress]: [ 366 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.348 * * * * [progress]: [ 367 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.348 * * * * [progress]: [ 368 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.348 * * * * [progress]: [ 369 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.349 * * * * [progress]: [ 370 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.349 * * * * [progress]: [ 371 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.352 * * * * [progress]: [ 372 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.352 * * * * [progress]: [ 373 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.352 * * * * [progress]: [ 374 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.352 * * * * [progress]: [ 375 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.352 * * * * [progress]: [ 376 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.352 * * * * [progress]: [ 377 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.353 * * * * [progress]: [ 378 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.353 * * * * [progress]: [ 379 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.353 * * * * [progress]: [ 380 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.353 * * * * [progress]: [ 381 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.353 * * * * [progress]: [ 382 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.353 * * * * [progress]: [ 383 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.353 * * * * [progress]: [ 384 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.353 * * * * [progress]: [ 385 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.353 * * * * [progress]: [ 386 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.353 * * * * [progress]: [ 387 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.353 * * * * [progress]: [ 388 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.353 * * * * [progress]: [ 389 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.353 * * * * [progress]: [ 390 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.353 * * * * [progress]: [ 391 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.353 * * * * [progress]: [ 392 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.354 * * * * [progress]: [ 393 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.354 * * * * [progress]: [ 394 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.354 * * * * [progress]: [ 395 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.354 * * * * [progress]: [ 396 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.354 * * * * [progress]: [ 397 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.354 * * * * [progress]: [ 398 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.354 * * * * [progress]: [ 399 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.354 * * * * [progress]: [ 400 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.354 * * * * [progress]: [ 401 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.354 * * * * [progress]: [ 402 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.354 * * * * [progress]: [ 403 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.354 * * * * [progress]: [ 404 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.354 * * * * [progress]: [ 405 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.354 * * * * [progress]: [ 406 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.355 * * * * [progress]: [ 407 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.355 * * * * [progress]: [ 408 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.355 * * * * [progress]: [ 409 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.355 * * * * [progress]: [ 410 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.355 * * * * [progress]: [ 411 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.355 * * * * [progress]: [ 412 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.355 * * * * [progress]: [ 413 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.355 * * * * [progress]: [ 414 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.355 * * * * [progress]: [ 415 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.355 * * * * [progress]: [ 416 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.355 * * * * [progress]: [ 417 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.355 * * * * [progress]: [ 418 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.355 * * * * [progress]: [ 419 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.355 * * * * [progress]: [ 420 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.355 * * * * [progress]: [ 421 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.356 * * * * [progress]: [ 422 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.356 * * * * [progress]: [ 423 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.356 * * * * [progress]: [ 424 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.356 * * * * [progress]: [ 425 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.356 * * * * [progress]: [ 426 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.356 * * * * [progress]: [ 427 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.356 * * * * [progress]: [ 428 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.356 * * * * [progress]: [ 429 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.356 * * * * [progress]: [ 430 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.356 * * * * [progress]: [ 431 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.356 * * * * [progress]: [ 432 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.356 * * * * [progress]: [ 433 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.356 * * * * [progress]: [ 434 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.356 * * * * [progress]: [ 435 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.357 * * * * [progress]: [ 436 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.357 * * * * [progress]: [ 437 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.357 * * * * [progress]: [ 438 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.357 * * * * [progress]: [ 439 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.357 * * * * [progress]: [ 440 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.357 * * * * [progress]: [ 441 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.357 * * * * [progress]: [ 442 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.357 * * * * [progress]: [ 443 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.357 * * * * [progress]: [ 444 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.357 * * * * [progress]: [ 445 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2))))))>
41.357 * * * * [progress]: [ 446 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2))))))>
41.357 * * * * [progress]: [ 447 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (* (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))) (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))) (cbrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
41.357 * * * * [progress]: [ 448 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (cbrt (* (* (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
41.357 * * * * [progress]: [ 449 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (sqrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))) (sqrt (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
41.357 * * * * [progress]: [ 450 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (- (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (- (* l 2)))))>
41.357 * * * * [progress]: [ 451 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) l) (/ (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) 2))))>
41.357 * * * * [progress]: [ 452 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* 1 (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))))>
41.358 * * * * [progress]: [ 453 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (/ 1 (* l 2)))))>
41.358 * * * * [progress]: [ 454 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ 1 (/ (* l 2) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))))))>
41.358 * * * * [progress]: [ 455 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) l) 2)))>
41.358 * * * * [progress]: [ 456 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ (* l 2) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))))>
41.358 * * * * [progress]: [ 457 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* M h))) (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))))))>
41.358 * * * * [progress]: [ 458 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d)))))))>
41.358 * * * * [progress]: [ 459 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (* (* (sqrt (cbrt l)) (sqrt h)) (/ 2 (/ D d)))))))>
41.358 * * * * [progress]: [ 460 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* M (* M h))) (* (* l 2) (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d))))))))>
41.358 * * * * [progress]: [ 461 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* l 2) (* (sqrt h) (/ 2 (/ D d)))))))>
41.358 * * * * [progress]: [ 462 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (* (sqrt h) (/ 2 (/ D d)))))))>
41.358 * * * * [progress]: [ 463 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* M (* M h))) (* (* l 2) (* (sqrt (cbrt l)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))))))>
41.358 * * * * [progress]: [ 464 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* l 2) (* (sqrt (cbrt l)) (/ 2 (/ D d)))))))>
41.358 * * * * [progress]: [ 465 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (* (sqrt (cbrt l)) (/ 2 (/ D d)))))))>
41.358 * * * * [progress]: [ 466 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* M h))) (* (* l 2) (* (/ 2 (/ D d)) (/ 2 (/ D d)))))))>
41.358 * * * * [progress]: [ 467 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* M h))) (* (* l 2) (/ 2 (/ D d))))))>
41.358 * * * * [progress]: [ 468 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))>
41.358 * * * * [progress]: [ 469 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (* (sqrt (cbrt l)) (sqrt h))))))>
41.358 * * * * [progress]: [ 470 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))>
41.358 * * * * [progress]: [ 471 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt (cbrt l))))))>
41.358 * * * * [progress]: [ 472 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (posit16->real (real->posit16 (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))))>
41.359 * * * * [progress]: [ 473 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (pow (/ M (/ 2 (/ D d))) 1) h))) (* l 2))))>
41.359 * * * * [progress]: [ 474 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (exp (- (log M) (- (log 2) (- (log D) (log d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 475 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (exp (- (log M) (- (log 2) (log (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 476 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (exp (- (log M) (log (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 477 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (exp (log (/ M (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 478 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (log (exp (/ M (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 479 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (cbrt (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 480 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (cbrt (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 481 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (cbrt (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 482 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (* (cbrt (/ M (/ 2 (/ D d)))) (cbrt (/ M (/ 2 (/ D d))))) (cbrt (/ M (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 483 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (cbrt (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 484 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (sqrt (/ M (/ 2 (/ D d)))) (sqrt (/ M (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 485 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (- M) (- (/ 2 (/ D d)))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 486 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (* (cbrt (/ 2 (/ D d))) (cbrt (/ 2 (/ D d))))) (/ (cbrt M) (cbrt (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 487 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (sqrt (/ 2 (/ D d)))) (/ (cbrt M) (sqrt (/ 2 (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 488 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ (cbrt M) (/ (cbrt 2) (cbrt (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 489 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (sqrt (/ D d)))) (/ (cbrt M) (/ (cbrt 2) (sqrt (/ D d))))) h))) (* l 2))))>
41.359 * * * * [progress]: [ 490 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ (cbrt 2) (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 491 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ (cbrt M) (/ (cbrt 2) (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 492 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) 1))) (/ (cbrt M) (/ (cbrt 2) (/ (cbrt D) d)))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 493 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ (cbrt 2) (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 494 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (sqrt d)))) (/ (cbrt M) (/ (cbrt 2) (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 495 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) 1))) (/ (cbrt M) (/ (cbrt 2) (/ (sqrt D) d)))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 496 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ 1 (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ (cbrt 2) (/ D (cbrt d))))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 497 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ 1 (sqrt d)))) (/ (cbrt M) (/ (cbrt 2) (/ D (sqrt d))))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 498 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) (/ 1 1))) (/ (cbrt M) (/ (cbrt 2) (/ D d)))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 499 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) 1)) (/ (cbrt M) (/ (cbrt 2) (/ D d)))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 500 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (* (cbrt 2) (cbrt 2)) D)) (/ (cbrt M) (/ (cbrt 2) (/ 1 d)))) h))) (* l 2))))>
41.360 * * * * [progress]: [ 501 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ (cbrt M) (/ (sqrt 2) (cbrt (/ D d))))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 502 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (sqrt (/ D d)))) (/ (cbrt M) (/ (sqrt 2) (sqrt (/ D d))))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 503 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ (sqrt 2) (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 504 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ (cbrt M) (/ (sqrt 2) (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 505 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) 1))) (/ (cbrt M) (/ (sqrt 2) (/ (cbrt D) d)))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 506 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ (sqrt 2) (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 507 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ (sqrt D) (sqrt d)))) (/ (cbrt M) (/ (sqrt 2) (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 508 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ (sqrt D) 1))) (/ (cbrt M) (/ (sqrt 2) (/ (sqrt D) d)))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 509 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ 1 (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ (sqrt 2) (/ D (cbrt d))))) h))) (* l 2))))>
41.361 * * * * [progress]: [ 510 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ 1 (sqrt d)))) (/ (cbrt M) (/ (sqrt 2) (/ D (sqrt d))))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 511 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ 1 1))) (/ (cbrt M) (/ (sqrt 2) (/ D d)))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 512 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) 1)) (/ (cbrt M) (/ (sqrt 2) (/ D d)))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 513 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) D)) (/ (cbrt M) (/ (sqrt 2) (/ 1 d)))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 514 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ (cbrt M) (/ 2 (cbrt (/ D d))))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 515 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (sqrt (/ D d)))) (/ (cbrt M) (/ 2 (sqrt (/ D d))))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 516 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ 2 (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 517 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ (cbrt M) (/ 2 (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 518 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ (* (cbrt D) (cbrt D)) 1))) (/ (cbrt M) (/ 2 (/ (cbrt D) d)))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 519 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ 2 (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.362 * * * * [progress]: [ 520 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ (sqrt D) (sqrt d)))) (/ (cbrt M) (/ 2 (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 521 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ (sqrt D) 1))) (/ (cbrt M) (/ 2 (/ (sqrt D) d)))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 522 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ 1 (* (cbrt d) (cbrt d))))) (/ (cbrt M) (/ 2 (/ D (cbrt d))))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 523 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ 1 (sqrt d)))) (/ (cbrt M) (/ 2 (/ D (sqrt d))))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 524 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 (/ 1 1))) (/ (cbrt M) (/ 2 (/ D d)))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 525 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 1)) (/ (cbrt M) (/ 2 (/ D d)))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 526 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 1 D)) (/ (cbrt M) (/ 2 (/ 1 d)))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 527 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) 1) (/ (cbrt M) (/ 2 (/ D d)))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 528 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) 2) (/ (cbrt M) (/ 1 (/ D d)))) h))) (* l 2))))>
41.363 * * * * [progress]: [ 529 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (* (cbrt M) (cbrt M)) (/ 2 D)) (/ (cbrt M) d)) h))) (* l 2))))>
41.363 * * * * [progress]: [ 530 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (* (cbrt (/ 2 (/ D d))) (cbrt (/ 2 (/ D d))))) (/ (sqrt M) (cbrt (/ 2 (/ D d))))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 531 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (sqrt (/ 2 (/ D d)))) (/ (sqrt M) (sqrt (/ 2 (/ D d))))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 532 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ (sqrt M) (/ (cbrt 2) (cbrt (/ D d))))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 533 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (sqrt (/ D d)))) (/ (sqrt M) (/ (cbrt 2) (sqrt (/ D d))))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 534 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ (cbrt 2) (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 535 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ (sqrt M) (/ (cbrt 2) (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 536 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) 1))) (/ (sqrt M) (/ (cbrt 2) (/ (cbrt D) d)))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 537 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ (cbrt 2) (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 538 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (sqrt d)))) (/ (sqrt M) (/ (cbrt 2) (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.364 * * * * [progress]: [ 539 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) 1))) (/ (sqrt M) (/ (cbrt 2) (/ (sqrt D) d)))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 540 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ 1 (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ (cbrt 2) (/ D (cbrt d))))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 541 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ 1 (sqrt d)))) (/ (sqrt M) (/ (cbrt 2) (/ D (sqrt d))))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 542 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) (/ 1 1))) (/ (sqrt M) (/ (cbrt 2) (/ D d)))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 543 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) 1)) (/ (sqrt M) (/ (cbrt 2) (/ D d)))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 544 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (* (cbrt 2) (cbrt 2)) D)) (/ (sqrt M) (/ (cbrt 2) (/ 1 d)))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 545 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ (sqrt M) (/ (sqrt 2) (cbrt (/ D d))))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 546 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (sqrt (/ D d)))) (/ (sqrt M) (/ (sqrt 2) (sqrt (/ D d))))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 547 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ (sqrt 2) (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.365 * * * * [progress]: [ 548 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ (sqrt M) (/ (sqrt 2) (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.366 * * * * [progress]: [ 549 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) 1))) (/ (sqrt M) (/ (sqrt 2) (/ (cbrt D) d)))) h))) (* l 2))))>
41.366 * * * * [progress]: [ 550 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ (sqrt 2) (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.366 * * * * [progress]: [ 551 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ (sqrt D) (sqrt d)))) (/ (sqrt M) (/ (sqrt 2) (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.366 * * * * [progress]: [ 552 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ (sqrt D) 1))) (/ (sqrt M) (/ (sqrt 2) (/ (sqrt D) d)))) h))) (* l 2))))>
41.366 * * * * [progress]: [ 553 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ 1 (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ (sqrt 2) (/ D (cbrt d))))) h))) (* l 2))))>
41.366 * * * * [progress]: [ 554 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ 1 (sqrt d)))) (/ (sqrt M) (/ (sqrt 2) (/ D (sqrt d))))) h))) (* l 2))))>
41.366 * * * * [progress]: [ 555 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) (/ 1 1))) (/ (sqrt M) (/ (sqrt 2) (/ D d)))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 556 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) 1)) (/ (sqrt M) (/ (sqrt 2) (/ D d)))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 557 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ (sqrt 2) D)) (/ (sqrt M) (/ (sqrt 2) (/ 1 d)))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 558 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ (sqrt M) (/ 2 (cbrt (/ D d))))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 559 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (sqrt (/ D d)))) (/ (sqrt M) (/ 2 (sqrt (/ D d))))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 560 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ 2 (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 561 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ (sqrt M) (/ 2 (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 562 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ (* (cbrt D) (cbrt D)) 1))) (/ (sqrt M) (/ 2 (/ (cbrt D) d)))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 563 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ 2 (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 564 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ (sqrt D) (sqrt d)))) (/ (sqrt M) (/ 2 (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.367 * * * * [progress]: [ 565 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ (sqrt D) 1))) (/ (sqrt M) (/ 2 (/ (sqrt D) d)))) h))) (* l 2))))>
41.368 * * * * [progress]: [ 566 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ 1 (* (cbrt d) (cbrt d))))) (/ (sqrt M) (/ 2 (/ D (cbrt d))))) h))) (* l 2))))>
41.368 * * * * [progress]: [ 567 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ 1 (sqrt d)))) (/ (sqrt M) (/ 2 (/ D (sqrt d))))) h))) (* l 2))))>
41.368 * * * * [progress]: [ 568 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 (/ 1 1))) (/ (sqrt M) (/ 2 (/ D d)))) h))) (* l 2))))>
41.368 * * * * [progress]: [ 569 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 1)) (/ (sqrt M) (/ 2 (/ D d)))) h))) (* l 2))))>
41.368 * * * * [progress]: [ 570 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 1 D)) (/ (sqrt M) (/ 2 (/ 1 d)))) h))) (* l 2))))>
41.368 * * * * [progress]: [ 571 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) 1) (/ (sqrt M) (/ 2 (/ D d)))) h))) (* l 2))))>
41.368 * * * * [progress]: [ 572 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) 2) (/ (sqrt M) (/ 1 (/ D d)))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 573 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (sqrt M) (/ 2 D)) (/ (sqrt M) d)) h))) (* l 2))))>
41.369 * * * * [progress]: [ 574 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (* (cbrt (/ 2 (/ D d))) (cbrt (/ 2 (/ D d))))) (/ M (cbrt (/ 2 (/ D d))))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 575 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (sqrt (/ 2 (/ D d)))) (/ M (sqrt (/ 2 (/ D d))))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 576 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ M (/ (cbrt 2) (cbrt (/ D d))))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 577 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (sqrt (/ D d)))) (/ M (/ (cbrt 2) (sqrt (/ D d))))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 578 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ M (/ (cbrt 2) (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 579 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ M (/ (cbrt 2) (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 580 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) 1))) (/ M (/ (cbrt 2) (/ (cbrt D) d)))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 581 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ M (/ (cbrt 2) (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.369 * * * * [progress]: [ 582 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (sqrt d)))) (/ M (/ (cbrt 2) (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 583 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) 1))) (/ M (/ (cbrt 2) (/ (sqrt D) d)))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 584 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ 1 (* (cbrt d) (cbrt d))))) (/ M (/ (cbrt 2) (/ D (cbrt d))))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 585 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ 1 (sqrt d)))) (/ M (/ (cbrt 2) (/ D (sqrt d))))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 586 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) (/ 1 1))) (/ M (/ (cbrt 2) (/ D d)))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 587 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) 1)) (/ M (/ (cbrt 2) (/ D d)))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 588 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (* (cbrt 2) (cbrt 2)) D)) (/ M (/ (cbrt 2) (/ 1 d)))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 589 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ M (/ (sqrt 2) (cbrt (/ D d))))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 590 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (sqrt (/ D d)))) (/ M (/ (sqrt 2) (sqrt (/ D d))))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 591 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ M (/ (sqrt 2) (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.370 * * * * [progress]: [ 592 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ M (/ (sqrt 2) (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 593 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) 1))) (/ M (/ (sqrt 2) (/ (cbrt D) d)))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 594 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ M (/ (sqrt 2) (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 595 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ (sqrt D) (sqrt d)))) (/ M (/ (sqrt 2) (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 596 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ (sqrt D) 1))) (/ M (/ (sqrt 2) (/ (sqrt D) d)))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 597 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ 1 (* (cbrt d) (cbrt d))))) (/ M (/ (sqrt 2) (/ D (cbrt d))))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 598 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ 1 (sqrt d)))) (/ M (/ (sqrt 2) (/ D (sqrt d))))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 599 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) (/ 1 1))) (/ M (/ (sqrt 2) (/ D d)))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 600 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) 1)) (/ M (/ (sqrt 2) (/ D d)))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 601 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ (sqrt 2) D)) (/ M (/ (sqrt 2) (/ 1 d)))) h))) (* l 2))))>
41.371 * * * * [progress]: [ 602 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ M (/ 2 (cbrt (/ D d))))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 603 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (sqrt (/ D d)))) (/ M (/ 2 (sqrt (/ D d))))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 604 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ M (/ 2 (/ (cbrt D) (cbrt d))))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 605 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ M (/ 2 (/ (cbrt D) (sqrt d))))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 606 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ (* (cbrt D) (cbrt D)) 1))) (/ M (/ 2 (/ (cbrt D) d)))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 607 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ M (/ 2 (/ (sqrt D) (cbrt d))))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 608 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ (sqrt D) (sqrt d)))) (/ M (/ 2 (/ (sqrt D) (sqrt d))))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 609 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ (sqrt D) 1))) (/ M (/ 2 (/ (sqrt D) d)))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 610 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ 1 (* (cbrt d) (cbrt d))))) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))>
41.372 * * * * [progress]: [ 611 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ 1 (sqrt d)))) (/ M (/ 2 (/ D (sqrt d))))) h))) (* l 2))))>
41.373 * * * * [progress]: [ 612 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 (/ 1 1))) (/ M (/ 2 (/ D d)))) h))) (* l 2))))>
41.373 * * * * [progress]: [ 613 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 1)) (/ M (/ 2 (/ D d)))) h))) (* l 2))))>
41.373 * * * * [progress]: [ 614 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 1 D)) (/ M (/ 2 (/ 1 d)))) h))) (* l 2))))>
41.373 * * * * [progress]: [ 615 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 1) (/ M (/ 2 (/ D d)))) h))) (* l 2))))>
41.373 * * * * [progress]: [ 616 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 2) (/ M (/ 1 (/ D d)))) h))) (* l 2))))>
41.373 * * * * [progress]: [ 617 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ 1 (/ 2 D)) (/ M d)) h))) (* l 2))))>
41.373 * * * * [progress]: [ 618 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* 1 (/ M (/ 2 (/ D d)))) h))) (* l 2))))>
41.373 * * * * [progress]: [ 619 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* M (/ 1 (/ 2 (/ D d)))) h))) (* l 2))))>
41.373 * * * * [progress]: [ 620 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ 1 (/ (/ 2 (/ D d)) M)) h))) (* l 2))))>
41.373 * * * * [progress]: [ 621 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (* (cbrt (/ 2 (/ D d))) (cbrt (/ 2 (/ D d))))) (cbrt (/ 2 (/ D d)))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 622 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (sqrt (/ 2 (/ D d)))) (sqrt (/ 2 (/ D d)))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 623 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ (cbrt 2) (cbrt (/ D d)))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 624 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (sqrt (/ D d)))) (/ (cbrt 2) (sqrt (/ D d)))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 625 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ (cbrt 2) (/ (cbrt D) (cbrt d)))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 626 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ (cbrt 2) (/ (cbrt D) (sqrt d)))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 627 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) 1))) (/ (cbrt 2) (/ (cbrt D) d))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 628 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ (cbrt 2) (/ (sqrt D) (cbrt d)))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 629 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (sqrt d)))) (/ (cbrt 2) (/ (sqrt D) (sqrt d)))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 630 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) 1))) (/ (cbrt 2) (/ (sqrt D) d))) h))) (* l 2))))>
41.374 * * * * [progress]: [ 631 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ 1 (* (cbrt d) (cbrt d))))) (/ (cbrt 2) (/ D (cbrt d)))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 632 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ 1 (sqrt d)))) (/ (cbrt 2) (/ D (sqrt d)))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 633 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) (/ 1 1))) (/ (cbrt 2) (/ D d))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 634 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) 1)) (/ (cbrt 2) (/ D d))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 635 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (* (cbrt 2) (cbrt 2)) D)) (/ (cbrt 2) (/ 1 d))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 636 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ (sqrt 2) (cbrt (/ D d)))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 637 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (sqrt (/ D d)))) (/ (sqrt 2) (sqrt (/ D d)))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 638 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ (sqrt 2) (/ (cbrt D) (cbrt d)))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 639 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ (sqrt 2) (/ (cbrt D) (sqrt d)))) h))) (* l 2))))>
41.375 * * * * [progress]: [ 640 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) 1))) (/ (sqrt 2) (/ (cbrt D) d))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 641 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ (sqrt 2) (/ (sqrt D) (cbrt d)))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 642 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ (sqrt D) (sqrt d)))) (/ (sqrt 2) (/ (sqrt D) (sqrt d)))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 643 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ (sqrt D) 1))) (/ (sqrt 2) (/ (sqrt D) d))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 644 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ 1 (* (cbrt d) (cbrt d))))) (/ (sqrt 2) (/ D (cbrt d)))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 645 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ 1 (sqrt d)))) (/ (sqrt 2) (/ D (sqrt d)))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 646 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) (/ 1 1))) (/ (sqrt 2) (/ D d))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 647 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) 1)) (/ (sqrt 2) (/ D d))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 648 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ (sqrt 2) D)) (/ (sqrt 2) (/ 1 d))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 649 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (* (cbrt (/ D d)) (cbrt (/ D d))))) (/ 2 (cbrt (/ D d)))) h))) (* l 2))))>
41.376 * * * * [progress]: [ 650 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (sqrt (/ D d)))) (/ 2 (sqrt (/ D d)))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 651 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d))))) (/ 2 (/ (cbrt D) (cbrt d)))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 652 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ (* (cbrt D) (cbrt D)) (sqrt d)))) (/ 2 (/ (cbrt D) (sqrt d)))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 653 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ (* (cbrt D) (cbrt D)) 1))) (/ 2 (/ (cbrt D) d))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 654 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ (sqrt D) (* (cbrt d) (cbrt d))))) (/ 2 (/ (sqrt D) (cbrt d)))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 655 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ (sqrt D) (sqrt d)))) (/ 2 (/ (sqrt D) (sqrt d)))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 656 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ (sqrt D) 1))) (/ 2 (/ (sqrt D) d))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 657 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ 1 (* (cbrt d) (cbrt d))))) (/ 2 (/ D (cbrt d)))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 658 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ 1 (sqrt d)))) (/ 2 (/ D (sqrt d)))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 659 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 (/ 1 1))) (/ 2 (/ D d))) h))) (* l 2))))>
41.377 * * * * [progress]: [ 660 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 1)) (/ 2 (/ D d))) h))) (* l 2))))>
41.378 * * * * [progress]: [ 661 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 1 D)) (/ 2 (/ 1 d))) h))) (* l 2))))>
41.378 * * * * [progress]: [ 662 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M 1) (/ 2 (/ D d))) h))) (* l 2))))>
41.378 * * * * [progress]: [ 663 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M 2) (/ 1 (/ D d))) h))) (* l 2))))>
41.378 * * * * [progress]: [ 664 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (/ M (/ 2 D)) d) h))) (* l 2))))>
41.378 * * * * [progress]: [ 665 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (* (cbrt M) (cbrt M)) (/ (/ 2 (/ D d)) (cbrt M))) h))) (* l 2))))>
41.378 * * * * [progress]: [ 666 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ (sqrt M) (/ (/ 2 (/ D d)) (sqrt M))) h))) (* l 2))))>
41.378 * * * * [progress]: [ 667 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ 1 (/ (/ 2 (/ D d)) M)) h))) (* l 2))))>
41.378 * * * * [progress]: [ 668 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ M 2) (/ D d)) h))) (* l 2))))>
41.378 * * * * [progress]: [ 669 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))>
41.378 * * * * [progress]: [ 670 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* +nan.0 (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.379 * * * * [progress]: [ 671 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.379 * * * * [progress]: [ 672 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>
41.379 * * * * [progress]: [ 673 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 l) 1/6)))) (* l 2))))>
41.379 * * * * [progress]: [ 674 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6))))))))) (* l 2))))>
41.379 * * * * [progress]: [ 675 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 l) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 l) 1/6))))))))) (* l 2))))>
41.379 * * * * [progress]: [ 676 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 (pow l 7)) 1/6))))))>
41.379 * * * * [progress]: [ 677 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))))))))>
41.379 * * * * [progress]: [ 678 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 (pow l 7)) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 (pow l 7)) 1/6)))))))))))>
41.379 * * * * [progress]: [ 679 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* 1/2 (/ (* M D) d)) h))) (* l 2))))>
41.380 * * * * [progress]: [ 680 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* 1/2 (/ (* M D) d)) h))) (* l 2))))>
41.380 * * * * [progress]: [ 681 / 681 ] simplifiying candidate #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* 1/2 (/ (* M D) d)) h))) (* l 2))))>
41.395 * [simplify]: Simplifying:
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))
  (sqrt (* (cbrt (/ d h)) (cbrt (/ d h))))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (* (cbrt h) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) (sqrt h)))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (/ (* (cbrt d) (cbrt d)) 1))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) 1))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ 1 (* (cbrt h) (cbrt h))))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  (sqrt (/ 1 1))
  (sqrt (/ d h))
  (sqrt 1)
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  (/ 1 2)
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log (* (/ M (/ 2 (/ D d))) h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (- (log 2) (log (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (- (log M) (log (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (+ (log (/ M (/ 2 (/ D d)))) (log h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (log (/ M (/ 2 (/ D d)))) (log (* (/ M (/ 2 (/ D d))) h))))
  (+ (+ (+ (log (fabs (/ (cbrt d) (cbrt l)))) (log (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (log (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (+ (+ (log (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (log (sqrt (/ d h)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (+ (- (log M) (- (log 2) (- (log D) (log d)))) (log h))))
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  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (* (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))))
  (cbrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (sqrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (sqrt (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (sqrt d)) (* M (* M h)))
  (* (* (sqrt (cbrt l)) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l))))) (* (* (sqrt (/ d h)) (sqrt (/ d h))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (/ (* (* D D) D) (* (* d d) d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (/ (* (* 2 2) 2) (* (* (/ D d) (/ D d)) (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (/ (* (* M M) M) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* h h) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l l) l) (* (* 2 2) 2)))
  (/ (* (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (* (/ M (/ 2 (/ D d))) h) (* (/ M (/ 2 (/ D d))) h)) (* (/ M (/ 2 (/ D d))) h)))) (* (* (* l 2) (* l 2)) (* l 2)))
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  (/ M (* (cbrt (/ 2 (/ D d))) (cbrt (/ 2 (/ D d)))))
  (/ M (sqrt (/ 2 (/ D d))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (* (cbrt (/ D d)) (cbrt (/ D d)))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (sqrt (/ D d))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d)))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) (sqrt d))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (* (cbrt D) (cbrt D)) 1)))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (* (cbrt d) (cbrt d)))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) (sqrt d))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ (sqrt D) 1)))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ 1 (* (cbrt d) (cbrt d)))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ 1 (sqrt d))))
  (/ M (/ (* (cbrt 2) (cbrt 2)) (/ 1 1)))
  (/ M (/ (* (cbrt 2) (cbrt 2)) 1))
  (/ M (/ (* (cbrt 2) (cbrt 2)) D))
  (/ M (/ (sqrt 2) (* (cbrt (/ D d)) (cbrt (/ D d)))))
  (/ M (/ (sqrt 2) (sqrt (/ D d))))
  (/ M (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d)))))
  (/ M (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (sqrt d))))
  (/ M (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) 1)))
  (/ M (/ (sqrt 2) (/ (sqrt D) (* (cbrt d) (cbrt d)))))
  (/ M (/ (sqrt 2) (/ (sqrt D) (sqrt d))))
  (/ M (/ (sqrt 2) (/ (sqrt D) 1)))
  (/ M (/ (sqrt 2) (/ 1 (* (cbrt d) (cbrt d)))))
  (/ M (/ (sqrt 2) (/ 1 (sqrt d))))
  (/ M (/ (sqrt 2) (/ 1 1)))
  (/ M (/ (sqrt 2) 1))
  (/ M (/ (sqrt 2) D))
  (/ M (/ 1 (* (cbrt (/ D d)) (cbrt (/ D d)))))
  (/ M (/ 1 (sqrt (/ D d))))
  (/ M (/ 1 (/ (* (cbrt D) (cbrt D)) (* (cbrt d) (cbrt d)))))
  (/ M (/ 1 (/ (* (cbrt D) (cbrt D)) (sqrt d))))
  (/ M (/ 1 (/ (* (cbrt D) (cbrt D)) 1)))
  (/ M (/ 1 (/ (sqrt D) (* (cbrt d) (cbrt d)))))
  (/ M (/ 1 (/ (sqrt D) (sqrt d))))
  (/ M (/ 1 (/ (sqrt D) 1)))
  (/ M (/ 1 (/ 1 (* (cbrt d) (cbrt d)))))
  (/ M (/ 1 (/ 1 (sqrt d))))
  (/ M (/ 1 (/ 1 1)))
  (/ M (/ 1 1))
  (/ M (/ 1 D))
  (/ M 1)
  (/ M 2)
  (/ M (/ 2 D))
  (/ (/ 2 (/ D d)) (cbrt M))
  (/ (/ 2 (/ D d)) (sqrt M))
  (/ (/ 2 (/ D d)) M)
  (/ M 2)
  (real->posit16 (/ M (/ 2 (/ D d))))
  (* +nan.0 (/ d h))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (- (+ (* +nan.0 (/ 1 (* (pow h 3) (pow d 2)))) (- (+ (* +nan.0 (/ 1 (* (pow h 2) d))) (- (* +nan.0 (/ 1 h)))))))
  (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 l) 1/6))))
  (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 l) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 l) 1/6)))))))))
  (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 l) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 l) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 l) 1/6)))))))))
  (* +nan.0 (* (* h (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))) (* (pow (/ 1 (pow d 4)) 1/3) (pow (/ 1 (pow l 7)) 1/6))))
  (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) (pow h 2)) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (+ (* +nan.0 (* (/ (* (fabs (pow (/ d l) 1/3)) (* (pow M 2) (pow D 2))) h) (* (pow (/ 1 (pow l 7)) 1/6) (pow (/ 1 (pow d 4)) 1/3)))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3)))) (pow (/ 1 (pow l 7)) 1/6)))))))))
  (- (+ (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) h) (pow (/ -1 (pow l 7)) 1/6)))) (- (+ (* +nan.0 (* (pow (/ -1 (pow l 7)) 1/6) (* (pow (/ 1 (pow d 4)) 1/3) (* (pow M 2) (* (pow D 2) (fabs (pow (/ d l) 1/3))))))) (- (* +nan.0 (* (pow (/ 1 (pow d 4)) 1/3) (* (/ (* (pow D 2) (* (fabs (pow (/ d l) 1/3)) (pow M 2))) (pow h 2)) (pow (/ -1 (pow l 7)) 1/6)))))))))
  (* 1/2 (/ (* M D) d))
  (* 1/2 (/ (* M D) d))
  (* 1/2 (/ (* M D) d))
41.425 * * [simplify]: iteration 1: (1159 enodes)
42.321 * * [simplify]: Extracting #0: cost 575 inf + 0
42.330 * * [simplify]: Extracting #1: cost 1958 inf + 169
42.344 * * [simplify]: Extracting #2: cost 2239 inf + 10867
42.376 * * [simplify]: Extracting #3: cost 1903 inf + 84159
42.423 * * [simplify]: Extracting #4: cost 1373 inf + 227774
42.519 * * [simplify]: Extracting #5: cost 995 inf + 400850
42.731 * * [simplify]: Extracting #6: cost 510 inf + 863529
43.062 * * [simplify]: Extracting #7: cost 215 inf + 1203843
43.441 * * [simplify]: Extracting #8: cost 160 inf + 1258999
43.897 * * [simplify]: Extracting #9: cost 88 inf + 1314981
44.334 * * [simplify]: Extracting #10: cost 26 inf + 1379913
44.834 * * [simplify]: Extracting #11: cost 8 inf + 1403324
45.282 * * [simplify]: Extracting #12: cost 0 inf + 1414137
45.725 * [simplify]: Simplified to:
  (log (sqrt (/ d h)))
  (exp (sqrt (/ d h)))
  (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h))))
  (cbrt (sqrt (/ d h)))
  (* (/ d h) (sqrt (/ d h)))
  (fabs (cbrt (/ d h)))
  (sqrt (cbrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (sqrt (* (/ (cbrt d) (cbrt h)) (/ (cbrt d) (cbrt h))))
  (sqrt (/ (cbrt d) (cbrt h)))
  (sqrt (/ (cbrt d) (/ (sqrt h) (cbrt d))))
  (sqrt (/ (cbrt d) (sqrt h)))
  (sqrt (* (cbrt d) (cbrt d)))
  (sqrt (/ (cbrt d) h))
  (sqrt (/ (sqrt d) (* (cbrt h) (cbrt h))))
  (sqrt (/ (sqrt d) (cbrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (/ (sqrt d) (sqrt h)))
  (sqrt (sqrt d))
  (sqrt (/ (sqrt d) h))
  (sqrt (/ (/ 1 (cbrt h)) (cbrt h)))
  (sqrt (/ d (cbrt h)))
  (sqrt (/ 1 (sqrt h)))
  (sqrt (/ d (sqrt h)))
  1
  (sqrt (/ d h))
  1
  (sqrt (/ d h))
  (sqrt d)
  (sqrt (/ 1 h))
  (sqrt d)
  (sqrt h)
  1/2
  (sqrt (sqrt (/ d h)))
  (sqrt (sqrt (/ d h)))
  (real->posit16 (sqrt (/ d h)))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (exp (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))))
  (* (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))))
  (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))
  (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))))))
  (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* (* M M) M) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))) (* (* (/ d h) (sqrt (/ d h))) (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))))
  (* (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))))
  (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d))))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))))
  (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h))))
  (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))))
  (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))))
  (* (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h))))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h)))))
  (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))))
  (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))))
  (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d))))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))))
  (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d))))))
  (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))))
  (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))))))
  (* (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))))))
  (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (cbrt (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (cbrt (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))))
  (cbrt (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (sqrt (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (sqrt (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (* (* (* M M) h) (* (sqrt d) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d)))))
  (* (sqrt (cbrt l)) (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d)))))
  (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (* (sqrt d) (/ (* (* M M) h) (/ 2 (/ D d)))))
  (* (sqrt (cbrt l)) (* (/ 2 (/ D d)) (sqrt h)))
  (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (* (sqrt d) (* (/ (* M h) (/ 2 (/ D d))) M)))
  (* (sqrt (cbrt l)) (* (/ 2 (/ D d)) (sqrt h)))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt d) (* (* M M) h)))
  (* (sqrt h) (* (/ 2 (/ D d)) (/ 2 (/ D d))))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt d) (/ (* (* M M) h) (/ 2 (/ D d)))))
  (* (/ 2 (/ D d)) (sqrt h))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt d) (* (/ (* M h) (/ 2 (/ D d))) M)))
  (* (/ 2 (/ D d)) (sqrt h))
  (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (* (sqrt (/ d h)) (* (* M M) h)))
  (* (sqrt (cbrt l)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))
  (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (* (sqrt (/ d h)) (/ (* (* M M) h) (/ 2 (/ D d)))))
  (* (sqrt (cbrt l)) (/ 2 (/ D d)))
  (* (* (/ (* M h) (/ 2 (/ D d))) M) (* (fabs (/ (cbrt d) (cbrt l))) (* (sqrt (cbrt d)) (sqrt (/ d h)))))
  (* (sqrt (cbrt l)) (/ 2 (/ D d)))
  (* (/ M (/ 2 (/ D d))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))
  (* (sqrt (/ d h)) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (* M M) h)))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (/ (* (* M M) h) (/ 2 (/ D d)))))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ (* M h) (/ 2 (/ D d))) M)))
  (* (* (sqrt d) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h))
  (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt d) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h)))
  (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (cbrt d))) (* (sqrt (/ d h)) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h)))
  (real->posit16 (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
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  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
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  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
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  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
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  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
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  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
  (log (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))))
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  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* l 2)))
  (/ (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h))))) (* (* l l) l)) 8)
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (/ (* (* (* M M) M) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (/ (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h)))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) (* l 2)))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l l) l)) (/ (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) 8))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* l 2)))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d))))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))) (* l 2)))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h)))))
  (/ (* (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h)))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h)))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h))) (* l 2)))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))))) (* (* l l) (* l 8)))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d))))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))) (* l 2)))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))))) (* (* l l) (* l 8)))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* l 2)))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* l 2)))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))))))
  (* (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))))) (* l 2)))
  (/ (* (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h)))))) (* (* l l) (* l 8)))
  (/ (/ (* (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h))) (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h)))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))))) (* (* l l) l)) 8)
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (/ (* (* l l) (* l 8)) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h)))))
  (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (* (fabs (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (* (* (/ (cbrt d) (cbrt l)) (sqrt (/ (cbrt d) (cbrt l)))) (* (/ d h) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h)))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l l) (* l 8)))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* h (* h h))) (* l 2)))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l l) l)) (/ (* (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) 8))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))))
  (/ (* (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l l) (* l 8)))
  (/ (* (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l l) (* l 8)))
  (/ (* (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* (* M M) M) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* l l) l)) 8)
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (/ (* (* (* M M) M) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* l 2)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l l) (* l 8)))
  (/ (* (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l 2) (* (* l 2) (* l 2))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l l) l)) (/ (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) 8))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* l 2)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h))))) (* (* l l) (* l 8)))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* l 2)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l l) (* l 8)) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d))))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))) (* l 2)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l l) l)) (/ (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) 8))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h)))))
  (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h)))) (* (* l l) (* l 8)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h)))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l l) l)) (/ (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) 8))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))) (* (* (/ d h) (sqrt (/ d h))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))))) (* (* l l) (* l 8)))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d))))))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l l) (* l 8)) (* (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))))))
  (/ (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l l) (* l 8)) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* l 2) (* (* l 2) (* l 2))))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l l) l)) (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))))) 8))
  (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))))))
  (/ (/ (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h)))) (* (* l l) l)) 8)
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h))) (* l 2)))
  (/ (* (* (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))) (* (* l l) (* l 8)))
  (* (/ (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))))) (* (* l 2) (* l 2))) (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))))) (* l 2)))
  (/ (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h))) (* (* (/ d h) (sqrt (/ d h))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l l) (* l 8)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* h (* h h))) (* l 2)))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l l) (* l 8)) (* (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))))
  (/ (/ (* (* (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* l 2) (* l 2))) (* l 2))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d))) 8))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l 2) (* (* l 2) (* l 2))) (/ (* (* (* M M) M) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l l) (* l 8)) (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))))))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h))))) (* l 2)))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l l) (* l 8)) (/ (* (* (* M M) M) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))) (* (/ 8 (* (* D D) D)) (* (* d d) d)))))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))))) (* (* l l) (* l 8)))
  (/ (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))))) (* (* l 2) (* l 2))) (* l 2))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))))) (* (* l l) (* l 8)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* l 2)))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l l) (* l 8)) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* l 2)))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))))) (* (* l l) (* l 8)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))) (* l 2)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) 8))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d))))) (* l 2)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) 8))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (* (* M M) M) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d)))) (* h (* h h))) (* l 2)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h))) 8))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* h (* h h)))))
  (/ (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))))) (* (* l l) (* l 8)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* h (* h h)))) (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d)))) (* l 2)))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))) 8))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ (/ (* (* M M) M) (* (/ 2 (/ D d)) (/ 2 (/ D d)))) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))) (/ (* M h) (/ 2 (/ D d)))))) (* (* l 2) (* (* l 2) (* l 2))))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) 8))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l 2) (* l 2))) (/ (* (* (* h (* h h)) (/ (* (* M M) M) (* (/ 8 (* (* D D) D)) (* (* d d) d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* l 2)))
  (/ (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))) (* (* l l) (* l 8)))
  (/ (/ (* (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (/ (* (* (* M M) M) (* h (* h h))) (/ (/ 8 (* (/ D d) (/ D d))) (/ D d))))) (* (* l 2) (* l 2))) (* l 2))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d)))))) 8))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (/ (* (* (* M M) M) (* h (* h h))) (* (* (/ 2 (/ D d)) (/ 2 (/ D d))) (/ 2 (/ D d))))))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l l) (* l 8)) (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h)))))
  (/ (* (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d)))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (/ M (/ 2 (/ D d))))) (* h (* h h))) (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* l 2) (* (* l 2) (* l 2))))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d))))))))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (* (/ (* M h) (/ 2 (/ D d))) (/ (* M h) (/ 2 (/ D d)))))))))
  (* (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* l l) l)) (/ (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h))) 8))
  (/ (* (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l))))) (/ d h)) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h)))))
  (/ (* (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (* (* l l) (* l 8)))
  (/ (* (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h)))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))) (/ (* (* l 2) (* (* l 2) (* l 2))) (* (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))))))
  (* (cbrt (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2)))) (cbrt (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2)))))
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  (* (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))) (* (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2))) (/ (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (/ l (/ (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h) 2)))))
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  (* (* (* (sqrt (/ (cbrt d) (cbrt l))) (fabs (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (- (* (* (/ M (/ 2 (/ D d))) (/ M (/ 2 (/ D d)))) h)))
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  (* (/ (* (cbrt M) (cbrt M)) (* (cbrt 2) (cbrt 2))) (/ 1 (sqrt d)))
  (* (/ (cbrt M) (cbrt 2)) (/ D (sqrt d)))
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  (/ (cbrt M) (/ (* (cbrt 2) (cbrt 2)) (cbrt M)))
  (/ (cbrt M) (* (/ (cbrt 2) D) d))
  (* (/ (* (cbrt M) (cbrt M)) (* (cbrt 2) (cbrt 2))) D)
  (/ (cbrt M) (* (/ (cbrt 2) 1) d))
  (* (/ (* (cbrt M) (cbrt M)) (sqrt 2)) (* (cbrt (/ D d)) (cbrt (/ D d))))
  (* (/ (cbrt M) (sqrt 2)) (cbrt (/ D d)))
  (* (/ (* (cbrt M) (cbrt M)) (sqrt 2)) (sqrt (/ D d)))
  (/ (cbrt M) (/ (sqrt 2) (sqrt (/ D d))))
  (* (/ (* (cbrt M) (cbrt M)) (sqrt 2)) (* (/ (cbrt D) (cbrt d)) (/ (cbrt D) (cbrt d))))
  (* (/ (cbrt M) (sqrt 2)) (/ (cbrt D) (cbrt d)))
  (* (/ (* (cbrt M) (cbrt M)) (sqrt 2)) (/ (* (cbrt D) (cbrt D)) (sqrt d)))
  (/ (cbrt M) (/ (sqrt 2) (/ (cbrt D) (sqrt d))))
  (/ (cbrt M) (/ (/ (sqrt 2) (* (cbrt D) (cbrt D))) (cbrt M)))
  (/ (cbrt M) (* (/ (sqrt 2) (cbrt D)) d))
  (* (/ (* (cbrt M) (cbrt M)) (sqrt 2)) (/ (/ (sqrt D) (cbrt d)) (cbrt d)))
  (/ (cbrt M) (/ (sqrt 2) (/ (sqrt D) (cbrt d))))
  (* (/ (* (cbrt M) (cbrt M)) (sqrt 2)) (/ (sqrt D) (sqrt d)))
  (/ (cbrt M) (/ (sqrt 2) (/ (sqrt D) (sqrt d))))
  (* (/ (* (cbrt M) (cbrt M)) (sqrt 2)) (sqrt D))
  (* (/ (cbrt M) (sqrt 2)) (/ (sqrt D) d))
  (/ (cbrt M) (/ (/ (sqrt 2) (/ (/ 1 (cbrt d)) (cbrt d))) (cbrt M)))
  (* (/ (cbrt M) (sqrt 2)) (/ D (cbrt d)))
  (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) (/ 1 (sqrt d))))
  (/ (cbrt M) (/ (sqrt 2) (/ D (sqrt d))))
  (/ (* (cbrt M) (cbrt M)) (sqrt 2))
  (/ (cbrt M) (* (/ (sqrt 2) D) d))
  (/ (* (cbrt M) (cbrt M)) (sqrt 2))
  (/ (cbrt M) (* (/ (sqrt 2) D) d))
  (/ (* (cbrt M) (cbrt M)) (/ (sqrt 2) D))
  (* (/ (cbrt M) (sqrt 2)) (/ 1 d))
  (/ (* (cbrt M) (cbrt M)) (/ 1 (* (cbrt (/ D d)) (cbrt (/ D d)))))
  (/ (cbrt M) (/ 2 (cbrt (/ D d))))
  (/ (* (cbrt M) (cbrt M)) (/ 1 (sqrt (/ D d))))
  (* (/ (cbrt M) 2) (sqrt (/ D d)))
  (/ (* (cbrt M) (cbrt M)) (/ 1 (* (/ (cbrt D) (cbrt d)) (/ (cbrt D) (cbrt d)))))
  (/ (cbrt M) (/ 2 (/ (cbrt D) (cbrt d))))
  (* (/ (* (cbrt M) (cbrt M)) 1) (/ (* (cbrt D) (cbrt D)) (sqrt d)))
  (* (/ (cbrt M) 2) (/ (cbrt D) (sqrt d)))
  (* (/ (* (cbrt M) (cbrt M)) 1) (* (cbrt D) (cbrt D)))
  (/ (cbrt M) (/ 2 (/ (cbrt D) d)))
  (* (/ (* (cbrt M) (cbrt M)) 1) (/ (/ (sqrt D) (cbrt d)) (cbrt d)))
  (/ (cbrt M) (* (/ 2 (sqrt D)) (cbrt d)))
  (/ (* (cbrt M) (cbrt M)) (/ 1 (/ (sqrt D) (sqrt d))))
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  (/ (cbrt M) (/ (/ 1 (sqrt D)) (cbrt M)))
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  (/ (* (cbrt M) (cbrt M)) (* (cbrt d) (cbrt d)))
  (/ (cbrt M) (* (/ 2 D) (cbrt d)))
  (/ (* (cbrt M) (cbrt M)) (sqrt d))
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  (/ (cbrt M) (/ 2 (/ D d)))
  (* (cbrt M) (cbrt M))
  (/ (cbrt M) (/ 2 (/ D d)))
  (/ (* (cbrt M) (cbrt M)) (/ 1 D))
  (/ (cbrt M) (* 2 d))
  (* (cbrt M) (cbrt M))
  (/ (cbrt M) (/ 2 (/ D d)))
  (/ (* (cbrt M) (cbrt M)) 2)
  (/ (cbrt M) (/ 1 (/ D d)))
  (/ (* (cbrt M) (cbrt M)) (/ 2 D))
  (/ (cbrt M) d)
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  (/ (sqrt M) (cbrt (/ 2 (/ D d))))
  (/ (sqrt M) (sqrt (/ 2 (/ D d))))
  (/ (sqrt M) (sqrt (/ 2 (/ D d))))
  (/ (sqrt M) (* (/ (cbrt 2) (cbrt (/ D d))) (/ (cbrt 2) (cbrt (/ D d)))))
  (/ (sqrt M) (/ (cbrt 2) (cbrt (/ D d))))
  (/ (sqrt M) (/ (cbrt 2) (/ (sqrt (/ D d)) (cbrt 2))))
  (* (/ (sqrt M) (cbrt 2)) (sqrt (/ D d)))
  (* (/ (sqrt M) (* (cbrt 2) (cbrt 2))) (* (/ (cbrt D) (cbrt d)) (/ (cbrt D) (cbrt d))))
  (* (/ (sqrt M) (cbrt 2)) (/ (cbrt D) (cbrt d)))
  (/ (sqrt M) (/ (cbrt 2) (/ (/ (* (cbrt D) (cbrt D)) (sqrt d)) (cbrt 2))))
  (/ (sqrt M) (/ (cbrt 2) (/ (cbrt D) (sqrt d))))
  (/ (sqrt M) (/ (cbrt 2) (/ (* (cbrt D) (cbrt D)) (cbrt 2))))
  (* (/ (sqrt M) (cbrt 2)) (/ (cbrt D) d))
  (/ (sqrt M) (/ (cbrt 2) (/ (/ (/ (sqrt D) (cbrt d)) (cbrt d)) (cbrt 2))))
  (/ (sqrt M) (/ (cbrt 2) (/ (sqrt D) (cbrt d))))
  (/ (sqrt M) (/ (cbrt 2) (/ (/ (sqrt D) (sqrt d)) (cbrt 2))))
  (* (/ (sqrt M) (cbrt 2)) (/ (sqrt D) (sqrt d)))
  (/ (sqrt M) (/ (cbrt 2) (/ (sqrt D) (cbrt 2))))
  (* (/ (sqrt M) (cbrt 2)) (/ (sqrt D) d))
  (/ (sqrt M) (/ (cbrt 2) (/ (/ (/ 1 (cbrt d)) (cbrt d)) (cbrt 2))))
  (* (/ (sqrt M) (cbrt 2)) (/ D (cbrt d)))
  (* (/ (sqrt M) (* (cbrt 2) (cbrt 2))) (/ 1 (sqrt d)))
  (/ (sqrt M) (* (/ (cbrt 2) D) (sqrt d)))
  (/ (sqrt M) (* (cbrt 2) (cbrt 2)))
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  (/ (sqrt M) (* (cbrt 2) (cbrt 2)))
  (* (/ (sqrt M) (cbrt 2)) (/ D d))
  (/ (sqrt M) (/ (cbrt 2) (/ D (cbrt 2))))
  (/ (sqrt M) (* (/ (cbrt 2) 1) d))
  (* (/ (sqrt M) (sqrt 2)) (* (cbrt (/ D d)) (cbrt (/ D d))))
  (* (/ (sqrt M) (sqrt 2)) (cbrt (/ D d)))
  (* (/ (sqrt M) (sqrt 2)) (sqrt (/ D d)))
  (* (/ (sqrt M) (sqrt 2)) (sqrt (/ D d)))
  (/ (sqrt M) (/ (sqrt 2) (* (/ (cbrt D) (cbrt d)) (/ (cbrt D) (cbrt d)))))
  (/ (sqrt M) (* (/ (sqrt 2) (cbrt D)) (cbrt d)))
  (* (/ (sqrt M) (sqrt 2)) (/ (* (cbrt D) (cbrt D)) (sqrt d)))
  (* (/ (sqrt M) (sqrt 2)) (/ (cbrt D) (sqrt d)))
  (* (/ (sqrt M) (sqrt 2)) (* (cbrt D) (cbrt D)))
  (* (/ (sqrt M) (sqrt 2)) (/ (cbrt D) d))
  (/ (sqrt M) (* (/ (sqrt 2) (sqrt D)) (* (cbrt d) (cbrt d))))
  (* (/ (sqrt M) (sqrt 2)) (/ (sqrt D) (cbrt d)))
  (* (/ (sqrt M) (sqrt 2)) (/ (sqrt D) (sqrt d)))
  (* (/ (sqrt M) (sqrt 2)) (/ (sqrt D) (sqrt d)))
  (/ (sqrt M) (/ (sqrt 2) (sqrt D)))
  (* (/ (sqrt M) (sqrt 2)) (/ (sqrt D) d))
  (* (/ (sqrt M) (sqrt 2)) (/ (/ 1 (cbrt d)) (cbrt d)))
  (* (/ (sqrt M) (sqrt 2)) (/ D (cbrt d)))
  (* (/ (sqrt M) (sqrt 2)) (/ 1 (sqrt d)))
  (* (/ (sqrt M) (sqrt 2)) (/ D (sqrt d)))
  (/ (sqrt M) (sqrt 2))
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  (/ (sqrt M) (sqrt 2))
  (* (/ (sqrt M) (sqrt 2)) (/ D d))
  (/ (sqrt M) (/ (sqrt 2) D))
  (/ (sqrt M) (/ (sqrt 2) (/ 1 d)))
  (* (/ (sqrt M) 1) (* (cbrt (/ D d)) (cbrt (/ D d))))
  (* (/ (sqrt M) 2) (cbrt (/ D d)))
  (* (/ (sqrt M) 1) (sqrt (/ D d)))
  (/ (sqrt M) (/ 2 (sqrt (/ D d))))
  (* (/ (sqrt M) 1) (* (/ (cbrt D) (cbrt d)) (/ (cbrt D) (cbrt d))))
  (* (/ (sqrt M) 2) (/ (cbrt D) (cbrt d)))
  (* (/ (sqrt M) 1) (/ (* (cbrt D) (cbrt D)) (sqrt d)))
  (* (/ (sqrt M) 2) (/ (cbrt D) (sqrt d)))
  (* (/ (sqrt M) 1) (* (cbrt D) (cbrt D)))
  (* (/ (sqrt M) 2) (/ (cbrt D) d))
  (* (/ (sqrt M) 1) (/ (/ (sqrt D) (cbrt d)) (cbrt d)))
  (/ (sqrt M) (* (/ 2 (sqrt D)) (cbrt d)))
  (* (/ (sqrt M) 1) (/ (sqrt D) (sqrt d)))
  (* (/ (sqrt M) 2) (/ (sqrt D) (sqrt d)))
  (/ (sqrt M) (/ 1 (sqrt D)))
  (* (/ (sqrt M) 2) (/ (sqrt D) d))
  (/ (sqrt M) (* (cbrt d) (cbrt d)))
  (/ (sqrt M) (* (/ 2 D) (cbrt d)))
  (/ (sqrt M) (sqrt d))
  (/ (sqrt M) (/ 2 (/ D (sqrt d))))
  (sqrt M)
  (/ (sqrt M) (/ 2 (/ D d)))
  (sqrt M)
  (/ (sqrt M) (/ 2 (/ D d)))
  (* (/ (sqrt M) 1) D)
  (/ (sqrt M) (* 2 d))
  (sqrt M)
  (/ (sqrt M) (/ 2 (/ D d)))
  (/ (sqrt M) 2)
  (/ (sqrt M) (/ 1 (/ D d)))
  (* (/ (sqrt M) 2) D)
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  (/ (/ 1 (cbrt (/ 2 (/ D d)))) (cbrt (/ 2 (/ D d))))
  (/ M (cbrt (/ 2 (/ D d))))
  (/ 1 (sqrt (/ 2 (/ D d))))
  (/ M (sqrt (/ 2 (/ D d))))
  (/ 1 (* (/ (cbrt 2) (cbrt (/ D d))) (/ (cbrt 2) (cbrt (/ D d)))))
  (/ M (/ (cbrt 2) (cbrt (/ D d))))
  (/ 1 (/ (cbrt 2) (/ (sqrt (/ D d)) (cbrt 2))))
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  (* (/ 1 (* (cbrt 2) (cbrt 2))) (* (/ (cbrt D) (cbrt d)) (/ (cbrt D) (cbrt d))))
  (/ M (/ (cbrt 2) (/ (cbrt D) (cbrt d))))
  (/ 1 (/ (cbrt 2) (/ (/ (* (cbrt D) (cbrt D)) (sqrt d)) (cbrt 2))))
  (/ M (/ (cbrt 2) (/ (cbrt D) (sqrt d))))
  (/ 1 (/ (cbrt 2) (/ (* (cbrt D) (cbrt D)) (cbrt 2))))
  (/ M (* (/ (cbrt 2) (cbrt D)) d))
  (/ 1 (/ (cbrt 2) (/ (/ (/ (sqrt D) (cbrt d)) (cbrt d)) (cbrt 2))))
  (/ M (/ (cbrt 2) (/ (sqrt D) (cbrt d))))
  (/ 1 (/ (cbrt 2) (/ (/ (sqrt D) (sqrt d)) (cbrt 2))))
  (/ M (* (/ (cbrt 2) (sqrt D)) (sqrt d)))
  (/ 1 (/ (cbrt 2) (/ (sqrt D) (cbrt 2))))
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  (/ 1 (/ (cbrt 2) (/ (/ (/ 1 (cbrt d)) (cbrt d)) (cbrt 2))))
  (/ M (/ (cbrt 2) (/ D (cbrt d))))
  (* (/ 1 (* (cbrt 2) (cbrt 2))) (/ 1 (sqrt d)))
  (/ M (* (/ (cbrt 2) D) (sqrt d)))
  (/ 1 (* (cbrt 2) (cbrt 2)))
  (/ M (* (/ (cbrt 2) D) d))
  (/ 1 (* (cbrt 2) (cbrt 2)))
  (/ M (* (/ (cbrt 2) D) d))
  (/ 1 (/ (cbrt 2) (/ D (cbrt 2))))
  (/ M (* (/ (cbrt 2) 1) d))
  (/ 1 (/ (sqrt 2) (* (cbrt (/ D d)) (cbrt (/ D d)))))
  (* (/ M (sqrt 2)) (cbrt (/ D d)))
  (* (/ 1 (sqrt 2)) (sqrt (/ D d)))
  (* (/ M (sqrt 2)) (sqrt (/ D d)))
  (* (/ 1 (sqrt 2)) (* (/ (cbrt D) (cbrt d)) (/ (cbrt D) (cbrt d))))
  (/ M (* (/ (sqrt 2) (cbrt D)) (cbrt d)))
  (/ 1 (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (sqrt d))))
  (/ M (/ (sqrt 2) (/ (cbrt D) (sqrt d))))
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  (/ 1 (* (/ (sqrt 2) (sqrt D)) (* (cbrt d) (cbrt d))))
  (/ M (/ (sqrt 2) (/ (sqrt D) (cbrt d))))
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  (* (/ M (sqrt 2)) (/ D (cbrt d)))
  (* (/ 1 (sqrt 2)) (/ 1 (sqrt d)))
  (* (/ M (sqrt 2)) (/ D (sqrt d)))
  (/ 1 (sqrt 2))
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  (/ 1 (sqrt 2))
  (/ M (* (/ (sqrt 2) D) d))
  (* (/ 1 (sqrt 2)) D)
  (/ M (/ (sqrt 2) (/ 1 d)))
  (* (cbrt (/ D d)) (cbrt (/ D d)))
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  (sqrt (/ D d))
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  (* (/ M 2) (/ (cbrt D) (sqrt d)))
  (* (cbrt D) (cbrt D))
  (* (/ M 2) (/ (cbrt D) d))
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  (/ (sqrt D) (sqrt d))
  (* (/ M 2) (/ (sqrt D) (sqrt d)))
  (sqrt D)
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  1
  (/ M (/ 2 (/ D d)))
  1
  (/ M (/ 2 (/ D d)))
  D
  (/ M (* 2 d))
  1
  (/ M (/ 2 (/ D d)))
  1/2
  (* M (/ D d))
  (* 1/2 D)
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  (/ (/ M (cbrt (/ 2 (/ D d)))) (cbrt (/ 2 (/ D d))))
  (/ M (sqrt (/ 2 (/ D d))))
  (/ M (* (/ (cbrt 2) (cbrt (/ D d))) (/ (cbrt 2) (cbrt (/ D d)))))
  (/ M (/ (cbrt 2) (/ (sqrt (/ D d)) (cbrt 2))))
  (* (/ M (* (cbrt 2) (cbrt 2))) (* (/ (cbrt D) (cbrt d)) (/ (cbrt D) (cbrt d))))
  (/ M (/ (cbrt 2) (/ (/ (* (cbrt D) (cbrt D)) (sqrt d)) (cbrt 2))))
  (/ M (/ (cbrt 2) (/ (* (cbrt D) (cbrt D)) (cbrt 2))))
  (/ M (/ (cbrt 2) (/ (/ (/ (sqrt D) (cbrt d)) (cbrt d)) (cbrt 2))))
  (/ M (/ (cbrt 2) (/ (/ (sqrt D) (sqrt d)) (cbrt 2))))
  (/ M (/ (cbrt 2) (/ (sqrt D) (cbrt 2))))
  (/ M (/ (cbrt 2) (/ (/ (/ 1 (cbrt d)) (cbrt d)) (cbrt 2))))
  (* (/ M (* (cbrt 2) (cbrt 2))) (/ 1 (sqrt d)))
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  (/ M (* (cbrt 2) (cbrt 2)))
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  (/ M (/ (sqrt 2) (/ (* (cbrt D) (cbrt D)) (sqrt d))))
  (* (/ M (sqrt 2)) (* (cbrt D) (cbrt D)))
  (/ M (* (/ (sqrt 2) (sqrt D)) (* (cbrt d) (cbrt d))))
  (* (/ M (sqrt 2)) (/ (sqrt D) (sqrt d)))
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  (* (/ M (sqrt 2)) (/ (/ 1 (cbrt d)) (cbrt d)))
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  (/ M (sqrt 2))
  (/ M (sqrt 2))
  (* (/ M (sqrt 2)) D)
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  (* M (/ (* (cbrt D) (cbrt D)) (sqrt d)))
  (* M (* (cbrt D) (cbrt D)))
  (* M (/ (/ (sqrt D) (cbrt d)) (cbrt d)))
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  M
  M
  (* D M)
  M
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  (/ (/ 2 (/ D d)) M)
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  (real->posit16 (/ M (/ 2 (/ D d))))
  (* +nan.0 (/ d h))
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  (- (- (/ (* +nan.0 1) (* (* d d) (* h (* h h)))) (- (/ (* +nan.0 1) (* (* h h) d)) (* (/ 1 h) +nan.0))))
  (* (* +nan.0 (* h (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))))) (* (cbrt (/ 1 (* (* d d) (* d d)))) (pow (/ 1 l) 1/6)))
  (- (- (* (* +nan.0 (/ (fabs (cbrt (/ d l))) (/ h (* (* M M) (* D D))))) (* (cbrt (/ 1 (* (* d d) (* d d)))) (pow (/ 1 l) 1/6))) (- (* (/ (* (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))) (* (cbrt (/ 1 (* (* d d) (* d d)))) (pow (/ 1 l) 1/6))) (* h h)) +nan.0) (* +nan.0 (* (* (pow (/ 1 l) 1/6) (* (fabs (cbrt (/ d l))) (* (* M M) (* D D)))) (cbrt (/ 1 (* (* d d) (* d d)))))))))
  (- (- (* (* (* (cbrt (/ 1 (* (* d d) (* d d)))) (/ (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))) (* h h))) (pow (/ -1 l) 1/6)) +nan.0) (- (* +nan.0 (* (* (pow (/ -1 l) 1/6) (cbrt (/ 1 (* (* d d) (* d d))))) (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))))) (* (* +nan.0 (cbrt (/ 1 (* (* d d) (* d d))))) (* (pow (/ -1 l) 1/6) (/ (fabs (cbrt (/ d l))) (/ h (* (* M M) (* D D)))))))))
  (* (* +nan.0 (* h (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))))) (* (cbrt (/ 1 (* (* d d) (* d d)))) (pow (/ 1 (pow l 7)) 1/6)))
  (- (- (* (* +nan.0 (/ (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))) (* h h))) (* (cbrt (/ 1 (* (* d d) (* d d)))) (pow (/ 1 (pow l 7)) 1/6))) (- (* (* +nan.0 (/ (fabs (cbrt (/ d l))) (/ h (* (* M M) (* D D))))) (* (cbrt (/ 1 (* (* d d) (* d d)))) (pow (/ 1 (pow l 7)) 1/6))) (* (* (* (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))) (cbrt (/ 1 (* (* d d) (* d d))))) (pow (/ 1 (pow l 7)) 1/6)) +nan.0))))
  (- (- (* (* +nan.0 (cbrt (/ 1 (* (* d d) (* d d))))) (* (pow (/ -1 (pow l 7)) 1/6) (/ (fabs (cbrt (/ d l))) (/ h (* (* M M) (* D D)))))) (- (* (* (pow (/ -1 (pow l 7)) 1/6) (* (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))) (cbrt (/ 1 (* (* d d) (* d d)))))) +nan.0) (* (* +nan.0 (cbrt (/ 1 (* (* d d) (* d d))))) (* (pow (/ -1 (pow l 7)) 1/6) (/ (* (fabs (cbrt (/ d l))) (* (* M M) (* D D))) (* h h)))))))
  (* 1/2 (/ (* D M) d))
  (* 1/2 (/ (* D M) d))
  (* 1/2 (/ (* D M) d))
45.988 * * * [progress]: adding candidates to table
69.683 * [progress]: [Phase 3 of 3] Extracting.
69.684 * * [regime]: Finding splitpoints for: (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
69.700 * * * [regime-changes]: Trying 7 branch expressions: (D M (* M D) l h d (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))
69.700 * * * * [regimes]: Trying to branch on D from (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
70.083 * * * * [regimes]: Trying to branch on M from (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
70.372 * * * * [regimes]: Trying to branch on (* M D) from (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
71.050 * * * * [regimes]: Trying to branch on (* M D) from (#<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))>)
71.092 * * * * [regimes]: Trying to branch on l from (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
71.405 * * * * [regimes]: Trying to branch on h from (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
71.641 * * * * [regimes]: Trying to branch on d from (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
71.903 * * * * [regimes]: Trying to branch on (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))) from (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
72.218 * * * [regime]: Found split indices: #<option (#s(si 5 26) #s(si 1 48) #s(si 15 255))>
72.224 * [binary-search]: Only using regimes for bounds on (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))) and (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
72.225 * [regimes]: Found splitpoints: (#s(sp 5 (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))) -inf.0) #s(sp 1 (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))) -1.7428153322691488e-208) #s(sp 15 (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))) +nan.0)) , with alts (#<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt d)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (sqrt h)))))> #<alt (λ (d h l M D) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (fabs (cbrt d)) (sqrt (/ (cbrt d) h)))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ 0 (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ d h)) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt d) (sqrt (/ 1 l))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* d (* h (* (/ (* (/ M 2) D) d) (/ (* (/ M 2) D) d)))) (* (sqrt l) (sqrt h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (/ (cbrt d) (cbrt h))) (sqrt (/ (cbrt d) (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (/ (* (* M M) (* h d)) (* (* (sqrt l) (sqrt h)) (* (/ 2 (/ D d)) (/ 2 (/ D d))))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (posit16->real (real->posit16 (/ M (/ 2 (/ D d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* M (* (/ M (/ 2 (/ D d))) h))) (* (* l 2) (/ 2 (/ D d))))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (* (/ (/ 1 (cbrt d)) (cbrt d)) (/ M (/ 2 (/ D (cbrt d))))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (* (cbrt (sqrt (/ d h))) (cbrt (sqrt (/ d h)))) (cbrt (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (* (* (cbrt (sqrt (/ d l))) (cbrt (sqrt (/ d l)))) (cbrt (sqrt (/ d l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (cbrt (* (/ d h) (sqrt (/ d h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (sqrt (/ d l))) (sqrt (sqrt (/ d l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (* (sqrt (/ 1 (* (cbrt l) (cbrt l)))) (sqrt (/ d (cbrt l)))) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (sqrt (/ d h))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))> #<alt (λ (d h l M D) (- (* (sqrt (/ d l)) (sqrt (/ d h))) (/ (* (* (sqrt (/ d l)) (* (fabs (cbrt (/ d h))) (sqrt (cbrt (/ d h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2))))>)
72.226 * [simplify]: Simplifying:
  (if (<= (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))) -inf.0) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (sqrt (/ d h))) (/ (* (* (* (sqrt (/ d l)) (sqrt (/ d h))) (/ M (/ 2 (/ D d)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))) (if (<= (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))) -1.7428153322691488e-208) (* (* (pow (/ d h) (/ 1 2)) (pow (/ d l) (/ 1 2))) (- 1 (* (* (/ 1 2) (pow (/ (* M D) (* 2 d)) 2)) (/ h l)))) (- (* (* (fabs (cbrt d)) (sqrt (/ (cbrt d) l))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (/ (* (* (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))) (* (sqrt (/ 1 (* (cbrt h) (cbrt h)))) (sqrt (/ d (cbrt h))))) (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h))) (* l 2)))))
72.227 * * [simplify]: iteration 1: (64 enodes)
72.233 * * [simplify]: iteration 2: (86 enodes)
72.239 * * [simplify]: Extracting #0: cost 1 inf + 0
72.239 * * [simplify]: Extracting #1: cost 4 inf + 0
72.240 * * [simplify]: Extracting #2: cost 10 inf + 0
72.240 * * [simplify]: Extracting #3: cost 18 inf + 1
72.240 * * [simplify]: Extracting #4: cost 30 inf + 2
72.240 * * [simplify]: Extracting #5: cost 40 inf + 47
72.240 * * [simplify]: Extracting #6: cost 41 inf + 426
72.241 * * [simplify]: Extracting #7: cost 38 inf + 1374
72.241 * * [simplify]: Extracting #8: cost 36 inf + 2887
72.242 * * [simplify]: Extracting #9: cost 29 inf + 3916
72.243 * * [simplify]: Extracting #10: cost 22 inf + 5106
72.245 * * [simplify]: Extracting #11: cost 15 inf + 7603
72.247 * * [simplify]: Extracting #12: cost 9 inf + 11899
72.250 * * [simplify]: Extracting #13: cost 6 inf + 13593
72.254 * * [simplify]: Extracting #14: cost 4 inf + 15204
72.257 * * [simplify]: Extracting #15: cost 3 inf + 16211
72.261 * * [simplify]: Extracting #16: cost 2 inf + 17458
72.267 * * [simplify]: Extracting #17: cost 1 inf + 19907
72.272 * * [simplify]: Extracting #18: cost 0 inf + 22807
72.277 * [simplify]: Simplified to:
  (if (<= (* (- 1 (* (/ h l) (* (pow (/ (* M D) (* 2 d)) 2) 1/2))) (* (pow (/ d l) 1/2) (pow (/ d h) 1/2))) -inf.0) (- (* (sqrt (/ d h)) (* (sqrt (/ (cbrt d) l)) (fabs (cbrt d)))) (/ (* (* (/ M (/ 2 (/ D d))) (* (sqrt (/ d h)) (sqrt (/ d l)))) (* (/ M (/ 2 (/ D d))) h)) (* l 2))) (if (<= (* (- 1 (* (/ h l) (* (pow (/ (* M D) (* 2 d)) 2) 1/2))) (* (pow (/ d l) 1/2) (pow (/ d h) 1/2))) -1.7428153322691488e-208) (* (- 1 (* (/ h l) (* (pow (/ (* M D) (* 2 d)) 2) 1/2))) (* (pow (/ d l) 1/2) (pow (/ d h) 1/2))) (- (* (* (sqrt (/ (cbrt d) l)) (fabs (cbrt d))) (* (sqrt (/ d (cbrt h))) (sqrt (/ 1 (* (cbrt h) (cbrt h)))))) (/ (* (* (/ M (/ 2 (/ D d))) (* (/ M (/ 2 (/ D d))) h)) (* (* (sqrt (/ d (cbrt h))) (sqrt (/ 1 (* (cbrt h) (cbrt h))))) (* (fabs (/ (cbrt d) (cbrt l))) (sqrt (/ (cbrt d) (cbrt l)))))) (* l 2)))))
101.531 * [regime-testing]: Baseline error score: 13.909045850840773
101.535 * [regime-testing]: Oracle error score: 8.875891015204225
101.543 * [regime-testing]: End program error score: 12.413667759359317